| 1 | 1 | 2026 | 2 | Angel or devil: Discriminating hard samples and anomaly contaminations for unsupervised time series anomaly detection | Ruyi Zhang; Hongzuo Xu; Songlei Jian; Yusong Tan; Haifang Zhou; Rulin Xu |
| 2 | 1 | 2026 | 0 | Goldbach–Linnik type problems with one prime square and six prime cubes | Xue Han |
| 3 | 1 | 2026 | 0 | Spectral Signatures of Prime Factorization | Giuseppe Mussardo; Andrea Trombettoni |
| 4 | 1 | 2026 | 0 | Diophantine approximation with two squares and three biquadrates of primes | Yu Fu; Liqun Hu; Siqi Liu; Li Yang |
| 5 | 1 | 2026 | 0 | A Diophantine inequality with one prime of the form <i>p</i> = <i>m</i> <sup>2</sup> + <i>n</i> <sup>2</sup> + 1 | Yixin Liu; Jing Huang |
| 6 | 1 | 2026 | 0 | A system of two Diophantine inequalities with primes | Yanjun Dong; Qian Wang |
| 7 | 1 | 2026 | 0 | Aperiodicity in Low Dimensions | Павел В. Аврамов; Hao Tian; Li Li |
| 8 | 1 | 2026 | 0 | Xenoepistemics | Jordi Vallverdú |
| 9 | 1 | 2025 | 2 | Consciousness and Mathematics: A Number Theoretic Approach to Modelling Reality | Mahendra Samarawickrama |
| 10 | 1 | 2025 | 2 | A Brief Survey on the Riemann Hypothesis and Some Attempts to Prove It | Renato Spigler |
| 11 | 1 | 2025 | 1 | Bridging Mathematics and AI: A novel approach to Goldbach's Conjecture | Geraldo Gurgel Filho; Guilherme Dutra Gonzaga Jaime; Flavio Murilo de Oliveira G |
| 12 | 1 | 2025 | 0 | The GoldStepTrigger function and the spectral behavior of Goldbach decompositions: a signal-based heuristic for quantized patterns in computational metrology | Geraldo Gurgel Filho; Guilherme Dutra Gonzaga Jaime; Flavio Murilo de Oliveira G |
| 13 | 1 | 2025 | 0 | On Some Additive Properties of Multiplicative Subsemigroups of Semirings and Arithmetic Applications I | Derong Qiu |
| 14 | 1 | 2025 | 0 | A conjectura forte de goldbach e a função g(n): Análise da distribuição dos primos | Alice Maria Rodrigues Barros; Dayana Maria Silva Silvestre; Evódia Patrícia S. V |
| 15 | 1 | 2025 | 0 | Decomposições estritas em Goldbach: mínimo e máximo distintos, construção via CRT e algoritmos | Rafael Muhd Pedroso; Catiane Rodrigues Carvalho |
| 16 | 1 | 2025 | 0 | Mathematician Yitang Zhang: why did I return to China at 70? | Weijie Zhao |
| 17 | 1 | 2025 | 0 | Combinatorics on words and generating Dirichlet series of automatic sequences | Jean‐Paul Allouche; Jeffrey Shallit; Manon Stipulanti |
| 18 | 1 | 2025 | 0 | The Largest Circle Enclosing n Interior Lattice Points | Jianqiang Zhao |
| 19 | 1 | 2025 | 0 | Mathematization Through Application and Common Sense: Motivating Intellectual Activities of Schoolchildren with Digital Tools | Sergei Abramovich; Egor Malyutin; Сергей Поздняков |
| 20 | 1 | 2024 | 19 | E-Nose: Time–Frequency Attention Convolutional Neural Network for Gas Classification and Concentration Prediction | Minglv Jiang; Na Li; Mingyong Li; Zhou Wang; Yuan Tian; Kaiyan Peng; Haoran Shen |
| 21 | 1 | 2024 | 6 | Prime Number Sieving—A Systematic Review with Performance Analysis | Mircea Ghidarcea; Decebal Popescu |
| 22 | 1 | 2024 | 2 | Prime Number Theorem and Goldbach Conjecture | Peilin Zhou |
| 23 | 1 | 2024 | 1 | Computational challenges and solutions: Prime number generation for enhanced data security | Amal Ezz-Eldien; Mohamed Ezz; Amjad Alsirhani; Ayman Mohamed Mostafa; Abdullah A |
| 24 | 1 | 2024 | 1 | A Proof of Goldbach’s Conjecture | Peter Schorer |
| 25 | 1 | 2024 | 0 | New algebraic insights to the Goldbach conjecture | Aliaa Burqan |
| 26 | 1 | 2024 | 0 | Os teoremas de incompletude de Gödel e a conjectura de Goldbach | Francisco Odécio Sales; Kevin Cristian Paulino Freires; Maria Aparecida de Moura |
| 27 | 1 | 2024 | 0 | The Purposiveness Principle in Translation Evaluation | Biao Liu; Yunhua Deng |
| 28 | 1 | 2024 | 0 | Goldbach–Linnik–Type Problem of Symmetric Mixed Powers of Primes and Powers of Two | Fei Xue; Jinjiang Li; Min Zhang; Juanjuan Wu |
| 29 | 1 | 2024 | 0 | Temporal Direction, Intuitionism and Physics | Yuval Dolev |
| 30 | 1 | 2024 | 0 | Some Properties and Algorithms for Twin Primes | Gerardo Iovane; Patrizia Di Gironimo; Elmo Benedetto; Vittorio D’Alfonso |
| 31 | 1 | 2023 | 11 | Counterpossibles in science: an experimental study | Brian McLoone; Cassandra Grützner; Michael T. Stuart |
| 32 | 1 | 2023 | 9 | Unifying colors by primes | Han-Lin Li; Shu‐Cherng Fang; Bertrand M.T. Lin; Way Kuo |
| 33 | 1 | 2023 | 5 | Recursive Symmetries: Chemically Induced Combinatorics of Colorings of Hyperplanes of an 8-Cube for All Irreducible Representations | K. Balasubramanian |
| 34 | 1 | 2023 | 1 | A logical approach to validate the Goldbach conjecture: Part I | Manish Khare; Kalyanlakshmi Chitta |
| 35 | 1 | 2023 | 1 | The contribution of Jing-run Chen to number theory | Y Zhang |
| 36 | 1 | 2023 | 1 | Summing <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML"><mml:mrow><mml:mi>μ</mml:mi> <mml:mo>(</mml:mo> <mml:mi>n</mml:mi> <mml:mo>)</mml:mo></mml:mrow> </mml:math> : a faster elementary algorithm. | H. A. Helfgott; Lola Thompson |
| 37 | 1 | 2023 | 0 | The Proof and Decryption of Goldbach Conjecture | Linfu Ge |
| 38 | 1 | 2023 | 0 | Supply and Demand, Tax, Income, Profit and Proof of Goldbach’s Conjecture——Logic is the Basis of Correct Mathematical Measurement | Zhaocheng Wang |
| 39 | 1 | 2023 | 0 | Editorial for Journal of AppliedMath (Volume 1, Issue 4) | Sara I. Abdelsalam |
| 40 | 1 | 2023 | 0 | On a Conjecture of Cai–Zhang–Shen for Figurate Primes | Junli Zhang; Pengcheng Niu |
| 41 | 1 | 2023 | 0 | Optimization applications of Goldbach's conjecture | Bertrand M.T. Lin; Shin-Mei Lin; Shyong Jian Shyu |
| 42 | 1 | 2023 | 0 | All Prime Numbers Greater than 3 Could be Written as 1 + Multiplying of More than 2 Prime Numbers but vice versa is Not True | Mohammadreza Barghi |
| 43 | 1 | 2023 | 0 | Mahler’s Das Lied von der Erde and “Chinese Element” | DuoHan Zhang |
| 44 | 1 | 2023 | 0 | Chinese Mathematics 3: The 20th Century | Jinhai Liu; Robin Wilson |
| 45 | 1 | 2023 | 0 | Effective Procedures | Nathan Salmón |
| 46 | 1 | 2022 | 6 | On Undecidability of Finite Subsets Theory for Torsion Abelian Groups | Sergey Mikhailovich Dudakov |
| 47 | 1 | 2022 | 2 | Does Set Theory Really Ground Arithmetic Truth? | Alfredo Roque Freire |
| 48 | 1 | 2022 | 1 | The twin primes' infinite rule | Mi Zhou |
| 49 | 1 | 2021 | 12 | Oriented bipartite graphs and the Goldbach graph | Sandip Das; Prantar Ghosh; Shamik Ghosh; Sagnik Sen |
| 50 | 1 | 2021 | 7 | On the ergodic Waring–Goldbach problem | Theresa C. Anderson; Brian Cook; Kevin Hughes; Angel Kumchev |
| 51 | 1 | 2021 | 4 | Analytic study of norms of prime partitions | Abhimanyu Kumar |
| 52 | 1 | 2021 | 4 | A Note on the Reality of Incomputable Real Numbers and Its Systemic Significance | Gianfranco Minati |
| 53 | 1 | 2021 | 4 | The Values of the Periodic Zeta-Function at the Nontrivial Zeros of Riemann’s Zeta-Function | Janyarak Tongsomporn; Saeree Wananiyakul; Jörn Steuding |
| 54 | 1 | 2021 | 1 | THE BINARY GOLDBACH CONJECTURE | Jan Feliksiak |
| 55 | 1 | 2021 | 0 | Elucidating the Conceivability Argument | Júlia Telles de Menezes |
| 56 | 1 | 2021 | 0 | Critique of Kant on Arithmetic | Leslie Stevenson |
| 57 | 1 | 2021 | 0 | Discussion on the Teaching Method of “Python Programming” for Business Studies in Higher Vocational Education | Yi Peng |
| 58 | 1 | 2020 | 1 | “Because You’re Exploring this Huge Abstract Jungle…”: One Student’s Evolving Conceptions of Axiomatic Structure in Mathematics | Kathleen M. Clark; Cihan Can |
| 59 | 1 | 2020 | 0 | Inverse HuaLuogeng’s “Exception Set” Method | Mi Zhou; Hairui Liu |
| 60 | 1 | 2020 | 0 | Towards Cryptanalysis of a Variant Prime Numbers Algorithm | Bashir Kagara Yusuf; Kamil Ahmad Bin Mahmood |
| 61 | 1 | 2020 | 0 | Singular Adventures of Baron Bourgain in the Labyrinth of the Continuum | Alexander Gamburd |
| 62 | 1 | 2019 | 175 | Primality, Fractality, and Image Analysis | Emanuel Guariglia |
| 63 | 1 | 2019 | 44 | The Zeta and Related Functions: Recent Developments | H. M. Srivastava |
| 64 | 1 | 2019 | 5 | Spurious, Emergent Laws in Number Worlds | Cristian S. Calude; Karl Svozil |
| 65 | 1 | 2019 | 0 | The Equivalent of the Goldbach Conjecture and &quot;Even Number Is the Difference Between Two Prime Numbers&quot; | Mi Zhou |
| 66 | 1 | 2019 | 0 | Conjetura de GOLDBACH, números naturales y teorema de números primos | Yandry Marcelo Intriago-Delgado |
| 67 | 1 | 2019 | 0 | A Proof on the Conjecture of Twin Primes | Yue Zhang |
| 68 | 1 | 2018 | 2 | Design and Implementation of a Secure Communication Protocol | M. Viswanath; M. Ranjith Kumar |
| 69 | 1 | 2018 | 2 | One kind hybrid character sums and their upper bound estimates | Jianhong Zhao; Xiao Wang |
| 70 | 1 | 2018 | 2 | Distribution of the Largest Strong Goldbach Numbers Generated by Primes | Pingyuan Zhou; Ao Rong |
| 71 | 1 | 2018 | 1 | Números primos; método gráfico de la conjetura de GOLDBACH | Yandry Intriago Delgado |
| 72 | 1 | 2018 | 1 | Theory of Quantum Computation and Philosophy of Mathematics. Part II | Krzysztof Wójtowicz |
| 73 | 1 | 2018 | 0 | A DIFFERENT PERSPECTIVE ON PRIME NUMBERS: PROOF OF GOLDBACH CONJECTURE | Muzaffer AKSOY |
| 74 | 1 | 2018 | 0 | PRIME NUMBERS UNDER THE LIGHT OF PROVED GOLDBACH CONJECTURES | Muzaffer AKSOY |
| 75 | 1 | 2018 | 0 | Números primos; método gráfico de la conjetura de GOLDBACH | Yandry Marcelo Intriago-Delgado |
| 76 | 1 | 2018 | 0 | The Problem of Evil and the Grammar of Goodness | Eric Wiland |
| 77 | 1 | 2018 | 0 | CHINA’S FIGHT AGAINST CORRUPTION SINCE THE 18th CPC NATIONAL CONGRESS: ACHIEVEMENTS AND EXPERIENCES | Дэн Чжунхуа; Den Chzhunhua |
| 78 | 1 | 2018 | 0 | Small prime solutions of equations with powers 2 and 3 | LI Wei-ping; Tianze Wang; Wenxu Ge |
| 79 | 1 | 2018 | 0 | Some thoughts on the Goldbach's Conjecture (Part I) | Rosario D’Amico |
| 80 | 1 | 2018 | 0 | Some thoughts on the Goldbach’s Conjecture (Part II) | Rosario D’Amico |
| 81 | 1 | 2018 | 0 | A study of android calculator based on Lemoine’s conjecture | Junjie Huang; Ying Xiao; Chenglian Liu |
| 82 | 1 | 2018 | 0 | INTERPRETING THE AT-ISSUE STATUS OF NON-RESTRICTIVE RELATIVE CLAUSES IN A FOREIGN LANGUAGE: A CASE OF SERBIAN EFL STUDENTS | Ema Živković |
| 83 | 2 | 2025 | 0 | A Solution to Goldbach’S Conjecture | Abhijit Manohar |
| 84 | 2 | 2025 | 0 | A Reflective Examination of Even Integers and Prime Pair Decompositions in Goldbach?s Conjecture | Abhijit Manohar |
| 85 | 2 | 2023 | 0 | Foreword | Liming Ge; Jianya Liu; Jie Wu |
| 86 | 2 | 2023 | 0 | A New Conjecture: Any Whole Number Greater than 3 has the Equal Distance from Two Prime Numbers | Mohammadreza Barghi |
| 87 | 2 | 2022 | 0 | The Strong Goldbach Conjecture is True | Kiran Kalyankar; Onkar Wanve |
| 88 | 2 | 2021 | 0 | Solving Two Problems IN Number Theory | Mykhaylo Khusid |
| 89 | 2 | 2020 | 3 | Digital-to-Analog Converter Architectures Based on Polygonal and Prime Numbers | Yuanyang Du; Xueyan Bai; Manato Hirai; Shuhei Yamamoto; Anna Kuwana; Haruo Kobay |
| 90 | 2 | 2018 | 0 | A Compendium of Unlikely Parameterizations for Prime Pairs Related to the Goldbach Conjecture | J. Kenneth |
| 91 | 2 | 2018 | 0 | The Fundamental Theorem of Arithmetic and Goldbach Conjecture | Yang Tianze |
| 92 | 3 | 2026 | 0 | Prime Numbers and Indian Contributions to Analytic Number Theory | Amit Kumar Alok |
| 93 | 3 | 2025 | 0 | How to Pose the Mathematical Problem of the Goldbach's Strong Conjecture ? A New Idea for a New Solution | Independent researcher. Nantes. Loire Atlantique. France; Bahbouhi Bouchaib |
| 94 | 3 | 2025 | 0 | A Concise Proof of the Legendre’s Conjecture | Zhang Yue |
| 95 | 3 | 2023 | 2 | Partitioning an even number of the new formulation into all pairs of odd numbers | Daniel Sankei; Loyford Njagi; Josephine Mutembei |
| 96 | 3 | 2022 | 19 | Deep Learning Applications | Longbing Cao |
| 97 | 3 | 2021 | 0 | Truth, beauty, and perfection | Steve Moss |
| 98 | 3 | 2020 | 1 | Verification of a Conjecture Proposed by N. Burshtein on a Particular Diophantine Equation | Nechemia Burshtein |
| 99 | 3 | 2020 | 0 | DISTRIBUTION OF INTEGERS WITH PRESCRIBED STRUCTURE AND APPLICATIONS | Kam Hung Yau |
| 100 | 3 | 2019 | 1 | The Program in Interdisciplinary Studies of the Institute for Advanced Study, Princeton | Michael Th. Rassias; Olaf Witkowski |
| 101 | 3 | 2019 | 0 | Semigraphs and Goldbach Conjecture | Hanumesha. A.G; K Meenakshi. |
| 102 | 3 | 2018 | 0 | An NP Complete Proof of Goldbach Conjecture | Samuel Bonaya Buya |
| 103 | 4 | 2024 | 1 | How Is Motivation Generated? Exploring The Truth About Motivation Generation from A Psychological Perspective | Xin Liu; Ni Jia |
| 104 | 4 | 2023 | 0 | Any Even Number Greater Than 6 Can be Written as the Sum of Two Prime Numbers | Xiaohui Li |
| 105 | 4 | 2022 | 0 | ADDITIONS TO THE TERNARY GOLDBACH PROBLEM AND SOLVING TWO TOPICAL PROBLEMS | Mykhaylo Khusid |
| 106 | 4 | 2021 | 0 | Goldbach's Conjecture | Adriko Bosco |
| 107 | 4 | 2020 | 4 | Caesar Cipher with Goldbach Code Compression for Efficient Cryptography | Jan Carlo T. Arroyo |
| 108 | 4 | 2020 | 1 | Goldbach's Conjecture: if it's unprovable, it must be true | Peter Lynch |
| 109 | 4 | 2020 | 0 | Irreducibility of a Polynomial Shifted by a Power of Another Polynomial | Artūras Dubickas |
| 110 | 4 | 2020 | 0 | Practical central binomial coefficients | Carlo Sanna |
| 111 | 4 | 2019 | 5 | Even numbers are the sum of two prime numbers | Shi Honwei; Mi Zhou; Zhang Delong; Jiang Xingyi; He Songting |
| 112 | 4 | 2018 | 4 | Green, Gold, Platinum, Nickel: On the Status of Open Access in Mathematics | Olaf Teschke |
| 113 | 5 | 2026 | 0 | Goldbach Conjecture: The Most Definitive and Comprehensive Disproof Ever Constructed | Sandeep S. Jaiswal |
| 114 | 5 | 2025 | 0 | Quantum Space-Time with Energy | Yajun Liu |
| 115 | 5 | 2025 | 0 | Investigating Computational Generalization of Mixed Polynomial Exponential on Diophantine Equations: αn + βn + α(αsψβs)m + D = r(uk + vk + wk) with consecutive α and β | Abraham Osogo Nyakebogo; Boaz Simatwo Kimtai |
| 116 | 5 | 2024 | 0 | Pointwise ergodic theorems for nonconventional bilinear polynomial averages along prime orbits | Hamed Mousavi |
| 117 | 5 | 2023 | 4 | A New Formulation of a Set of Even Numbers | Daniel Sankei; Loyford Njagi; Josephine Mutembei |
| 118 | 5 | 2023 | 0 | The Order of Numbers and the Goldbach Conjecture | Jacqueline Wötzel |
| 119 | 5 | 2022 | 0 | A Rudimentary Proof on Goldbach Conjectures | Talal Al-Ameen; Imad Muhi |
| 120 | 5 | 2022 | 0 | T. Tao and the Syracuse conjecture | Jean‐Paul Allouche |
| 121 | 5 | 2021 | 0 | A Weak Proof of the Goldbach Conjecture | Hiroyoshi KOZU |
| 122 | 5 | 2021 | 0 | Logic in general and mathematical logic in particular* | Bertrand Wong |
| 123 | 5 | 2021 | 0 | Exceptional Sets for Sums of Prime Cubes in Short Interval | Gongrui Chen |
| 124 | 5 | 2020 | 0 | A proof of the Goldbach conjecture | Hiroyoshi KOZU |
| 125 | 5 | 2020 | 0 | RIEMANN AND DIOPHANTINE’S CONTRIBUTION IN THE FIELD OF NUMBER THEORY | Pratik Kumar; Vikas Kumar; Md Saad Ahmed; Rajnish Tiwari; Md Saquib |
| 126 | 5 | 2018 | 1 | PENERAPAN ALGORITMA GOLDBACH CODES PADA KOMPRESI FILE GAMBAR TERENKRIPSI VIGENERE CIHPER | Muhammad Yogie |
| 127 | 6 | 2026 | 0 | A Mathematical Proof of the Strong Goldbach’s Conjecture | Vassilly Voinov |
| 128 | 6 | 2025 | 0 | Decomposing Even Integers into Prime and Composite Parts | Seonghwan Yang |
| 129 | 6 | 2024 | 0 | On Some Relationships of Symmetric Sums: $u^n+v^n+w^n+(u+v+w)^n=k(u+v+w)(x^{n-1}+y^{n-1}+z^{n-1})$ | Lao Hussein Mude |
| 130 | 6 | 2023 | 1 | Development of Number Theory and the Application in Cryptography | Wenchao Shang |
| 131 | 6 | 2023 | 1 | Additive decomposition of signed primes | Imre Z. Ruzsa |
| 132 | 6 | 2022 | 0 | ON A -ADDITIVE UNIQUENESS SET FOR MULTIPLICATIVE FUNCTIONS | Elchin Hasanalizade |
| 133 | 6 | 2020 | 8 | LSB Image Steganography with Data Compression Technique Using Goldbach G0 Code Algorithm | Jan Carlo T. Arroyo |
| 134 | 6 | 2020 | 0 | A New Postulate and Some Conjectures Concerning Pair Primes in the Interval [n!, (n + k)!] | Abiodun E. Adeyemi |
| 135 | 6 | 2019 | 3 | New Discovery on Goldbach | Idriss Olivier Bado |
| 136 | 6 | 2019 | 1 | A weak method to come close to solution of Goldbach conjecture | Pingyuan Zhou |
| 137 | 6 | 2019 | 0 | An Introduction To Complex Arithmetic and an Original Reformulation of the Goldbach Conjecture | Ikorong Annouk |
| 138 | 6 | 2019 | 0 | From the Goldbach Conjecture Cipher to the Han Ge CODE | Li Junchi |
| 139 | 6 | 2018 | 8 | Critical constructivism: interpreting mathematics education for social justice | Ole Skovsmose |
| 140 | 6 | 2018 | 1 | Goldbach's Function Approximation Using Deep Learning | Avigail Stekel; Merav Shukrun; Amos Azaria |
| 141 | 7 | 2026 | 0 | The Constant C and Local Stability in Goldbach’s Conjecture | Bahbouhi Bouchaib |
| 142 | 7 | 2024 | 2 | Representation and Generation of Prime and Coprime Numbers by Using Structured Algebraic Sums | Ioannis N. M. Papadakis |
| 143 | 7 | 2024 | 0 | Implications of Ramsey Choice principles in ZF$\mathsf {ZF}$ | Lorenz Halbeısen; Riccardo Plati; Saharon Shelah |
| 144 | 7 | 2024 | 0 | 两个素数和的筛法 | 山东即墨市瑞达包装辅料厂; 坤 崔; 丹 刘; 四川内江师范学院; 成龙 刘; 四川内江师范学院; 魁迎 闫; 河南省许昌供销学校 |
| 145 | 7 | 2024 | 0 | BREAKING DOWN MOMENTS: SUM REPRESENTATION VIA ODD PRIME NUMBERS | Yulduz Eshmuminova |
| 146 | 7 | 2024 | 0 | Analysis Of Abortion Legislation from The Perspective Of "Good Law" And "Bad Law" | Yuying Deng |
| 147 | 7 | 2024 | 0 | Kant’s Faculty Of Imagination And Its Epistemic Function | Vaishali Vaishali |
| 148 | 7 | 2023 | 0 | Integers expressible as sums of primes and composites | John M. Campbell |
| 149 | 7 | 2023 | 0 | For Mathematical Truth to Be Known: A Provability-based Condition Construction | Zhiru Lin |
| 150 | 7 | 2022 | 1 | Proofs of Beal’s Conjecture, Fermat’s Conjecture, Collatz Conjecture and Goldbach Conjecture | T M Nishad; Mohamed M Azzedine |
| 151 | 7 | 2021 | 0 | Waring–Goldbach Problem of Even Powers in Short Intervals | Liqun Hu; Tanhui Zhang |
| 152 | 7 | 2020 | 0 | A Note on Variable-Length Codes with Constant Hamming Weights | Peter Fenwick |
| 153 | 7 | 2020 | 0 | Perancangan Aplikasi Kamus Bahasa Inggris Dengan Menerapkan Algoritma Kompresi Goldbach Code | Febriani Siregar |
| 154 | 7 | 2020 | 0 | The obscurity of the physical: an objection to Chalmers’ conceivability argument | Felipe G. A. Moreira |
| 155 | 7 | 2019 | 1 | THE THIRD REALM AND THE FAILURE OF ITS NATURALIZATION IN KARL POPPER’S CONCEPTION OF WORLD | Dmytro Sepetyi |
| 156 | 7 | 2019 | 0 | Refined Goldbach Conjectures with Primes in Progressions | Kimball Martin |
| 157 | 7 | 2019 | 0 | The density of integers representable as the sum of four prime cubes | Christian Elsholtz; Jan‐Christoph Schlage‐Puchta |
| 158 | 8 | 2025 | 0 | Alfréd Rényi, the Density of L-Zeros and the Goldbach Conjecture | J. Pintz |
| 159 | 8 | 2025 | 0 | Solution to the Goldbach Conjecture | Le Thanh Duc; Le Thi Thu Thuy |
| 160 | 8 | 2025 | 0 | Recursive Partitioning of Odd Integers into Primes and Semiprimes: A Novel Framework Toward Validating Lemoine’s Conjecture | Duncan Ndegwa; Loyford Njagi; Stephen Wanyonyi Luketero; BM Nzimbi; Kikwai Benja |
| 161 | 8 | 2025 | 0 | A Curious Note around the Perfect Numbers Problem | Ikorong Annouk |
| 162 | 8 | 2025 | 0 | Progressive Self-Learning for Domain Adaptation on Symbolic Regression of Integer Sequences | Yaohui Zhu; Kai‐Ming Sun; Zhendong Luo; Lingfeng Wang |
| 163 | 8 | 2025 | 0 | Understanding Xi Jinping’s Guidelines on the Party’s Self-Reform | Lingjun Zhu |
| 164 | 8 | 2024 | 9 | On the Distribution of the Prime Numbers | Lolav Ahmed Khalil |
| 165 | 8 | 2024 | 3 | BOUNDING ZETA ON THE 1-LINE UNDER THE PARTIAL RIEMANN HYPOTHESIS | Andrés Chirre |
| 166 | 8 | 2024 | 2 | Distribution of the prime numbers | Lolav Ahmed Khalil |
| 167 | 8 | 2024 | 0 | A Goldbach Theorem for Laurent Polynomials with Positive Integer Coefficients | Sophia Liao; Harold Polo |
| 168 | 8 | 2024 | 0 | The Current Status and Practical Reflections on Mathematics Culture Teaching in Primary Schools | Yong‐Xin Guo |
| 169 | 8 | 2023 | 0 | Sums of One Prime Power and Four Prime Cubes in Short Intervals | Gen Li; Xianjiu Huang; Xiaoming Pan; Li Yang |
| 170 | 8 | 2023 | 0 | A Review of Prime Numbers, Squaring Prime Pattern, Different Types of Primes and Prime Factorization Analysis | Prabhat Mahato; Aayush Shah |
| 171 | 8 | 2023 | 0 | Open path theory: Pattern and structure in prime numbers | Diego Real |
| 172 | 8 | 2022 | 5 | On the Conditional Bounds for Siegel Zeros | Chao Hua Jia |
| 173 | 8 | 2022 | 0 | Fictional Resistance and Real Feelings | Niall Connolly |
| 174 | 8 | 2022 | 0 | On an additive problem of unlike powers in short intervals | Qingqing Zhang |
| 175 | 8 | 2022 | 0 | A quadratic form with prime variables associated with Hecke eigenvalues of a cusp form | Guodong Hua |
| 176 | 8 | 2021 | 0 | Research on Ideological and Political Integration of Curriculum in Colleges, Universities and Primary Schools | HaiboYi HaiboYi; Xiao Meng |
| 177 | 8 | 2020 | 2 | Tame torsion, the tame inverse Galois problem, and endomorphisms | Matthew Bisatt |
| 178 | 8 | 2020 | 0 | On pairs of equations involving unlike powers of primes and powers of 2 | Yuhui Liu |
| 179 | 8 | 2020 | 0 | Boolean Function Analogs of Covering Systems | Anthony Zaleski; Doron Zeilberger |
| 180 | 8 | 2020 | 0 | A formula for the number of solutions of a restricted linear congruence | K Vishnu Namboothiri |
| 181 | 8 | 2019 | 0 | Straddled numbers: numbers equal to the sum of powers of consecutive primes from the least prime factor to the largest prime factor | Miroslav Kureš |
| 182 | 8 | 2018 | 4 | On a Waring-Goldbach problem involving squares, cubes and biquadrates | Yuhui Liu |
| 183 | 8 | 2018 | 1 | Prof. Jianxing He: ones with more motive power and willpower, a better traveler he is | May M. Li |
| 184 | 9 | 2026 | 0 | Residue Recurrence and Scaling Properties in the Complex Embedding of Prime Numbers | Levente Csóka |
| 185 | 9 | 2025 | 1 | DIGITALLY RESTRICTED SETS AND THE GOLDBACH CONJECTURE | James Cumberbatch |
| 186 | 9 | 2025 | 1 | On Extension of Existing Results on the Diophantine Equation: \(\sum_{r=1}^n w_r^2+\frac{n}{3} d^2=3\left(\frac{n d^2}{3}+\sum_{r=1}^{\frac{n}{3}} w_{3 r-1}^2\right)\) | Nyakebogo Abraham Osogo; Kimtai Boaz Simatwo |
| 187 | 9 | 2025 | 0 | Analysis of the Related Corollaries, Concepts, and Impacts of the Fundamental Theorem of Arithmetic in Number Theory and Abstract Algebra | Wenbo Tang |
| 188 | 9 | 2025 | 0 | Natural Equidistant Primes (NEEP) and Cryptographic Coding of the Goldbach's Strong Conjecture | Independent researcher, Nantes, Loire Atlantique, France.; Bahbouhi Bouchaib |
| 189 | 9 | 2025 | 0 | An Analysis of Approaches to Goldbach's and De Polignac's Conjectures and Their Interconnections | Zilong Wang |
| 190 | 9 | 2025 | 0 | On the sum of partition norms and its connection to norms of partitions with parts greater than one | Meenakshi Rana; Harman Kaur; Abhimanyu Kumar |
| 191 | 9 | 2025 | 0 | Analysis of the Construction Thought of Generating Functions | Lewei Huang; Xuran Li; Mingyue Cao |
| 192 | 9 | 2024 | 2 | An Extension Proof of Riemann Hypothesis by a Logical Entails Truth Table | Kai Shun Lam |
| 193 | 9 | 2024 | 0 | The Proof of the Fermar's Last Theorem, Mersenne's Prime Conjecture and Poincare Conjecture in Euclidean Geometry | Liao Teng |
| 194 | 9 | 2024 | 0 | GROUNDBREAKING PROOF FOR GOLDBACH’S CONJECTURE VERIFICATION WITH MATHEMATICAL INDUCTIONFORMULA | Budee U Zaman |
| 195 | 9 | 2024 | 0 | Analyzing twin primes, Goldbach's strong conjecture and Polignac's conjecture | Mercedes Orús–Lacort; Román Orús; Christophe Jouis |
| 196 | 9 | 2023 | 3 | Foundations of Mathematical Education in the Digital Age | A. L. Semenov; Аlma Abylkassymova; S. A. Polikarpov |
| 197 | 9 | 2023 | 2 | Direct reference and the Goldbach puzzle | Stefan Rinner |
| 198 | 9 | 2023 | 0 | A Map Coloring Method | Shijun Han |
| 199 | 9 | 2023 | 0 | Solved and unsolved problems | Michael Th. Rassias |
| 200 | 9 | 2022 | 12 | A Proof of Goldbach Conjecture by Mirror Prime Decomposition | Yingxu Wang |
| 201 | 9 | 2022 | 8 | A Proof of the Twin Prime Conjecture in the Ƥ x Ƥ Space | Yingxu Wang |
| 202 | 9 | 2022 | 4 | A New Method to Study Goldbach Conjecture | Ke Li |
| 203 | 9 | 2022 | 4 | 2-Odd Labeling of Graphs Using Certain Number Theoretic Concepts and Graph Operations | Ajaz Ahmad Pir; Tabasum Mushtaq; A. Parthiban |
| 204 | 9 | 2022 | 2 | Regular Decimations Result in Irregular Distribution of Primes | Xin Wang |
| 205 | 9 | 2022 | 1 | Deep Learning Architectures for Approximating Goldbach’s Function in New Regions | Avigail Stekel; Amos Azaria |
| 206 | 9 | 2022 | 1 | A New Method to Prove Goldbach’s Conjecture | Zengyong Liang |
| 207 | 9 | 2022 | 1 | The continuity of prime numbers can lead to even continuity (Relationship with Gold Bach’s conjecture) | Ling Xie |
| 208 | 9 | 2022 | 0 | A Theoretical Approach on Deterministic and Probabilistic Prime Numbers | Sumit Tiwari; Atin Kushwaha |
| 209 | 9 | 2021 | 8 | Boolean Hypercubes: The Origin of a Tagged Recursive Logic and the Limits of Artificial Intelligence | Ramon Carbó‐Dorca |
| 210 | 9 | 2021 | 5 | Exceptional zeros and the Goldbach problem | John Friedlander; D. A. Goldston; Henryk Iwaniec; Ade Irma Suriajaya |
| 211 | 9 | 2021 | 1 | A characterization of functions using Lagrange's Four-Square Theorem | Imre Kátai; Bui Minh Phong |
| 212 | 9 | 2021 | 1 | A Diophantine Problem with Unlike Powers of Primes | Quanwu Mu; Liyan Xi |
| 213 | 9 | 2020 | 4 | Quasi-realism and normative certitude | Stina Björkholm; Krister Bykvist; Jonas Olson |
| 214 | 9 | 2020 | 2 | Solutions of the Diophantine Equations p x + (p + 1)y + (p + 2)z = M 2 for Primes p ≥ 2 when 1 ≤ x, y, z ≤ 2 | Nechemia Burshtein |
| 215 | 9 | 2020 | 2 | A complete classification of de mersenne´s primes and its iomplications for computing | Yeisson Alexis Acevedo Agudelo |
| 216 | 9 | 2020 | 0 | A pair of equations in unlike powers of primes and powers of 2 | Cai Yong; Liqun Hu |
| 217 | 9 | 2019 | 2 | On Mathematical Conjectures and Counterexamples | Ali Barahmand |
| 218 | 9 | 2019 | 1 | Remarks on Goldbach’s Conjecture on Prime Numbers | Silviu Guiaşu |
| 219 | 9 | 2019 | 0 | Truth-Predicates Still Not like Pronouns: a Reply to Salis | Arvid Båve |
| 220 | 9 | 2018 | 0 | Números Primos e Números de Mersenne | FEITEP - Faculdade de Engenharia e Inovação Técnico Profissional; Doherty Andrad |
| 221 | 9 | 2018 | 0 | Additive bases with coefficients of newforms | V. C. Garcia; Florin Nicolae |
| 222 | NA | 2026 | 0 | Proof of Goldbach conjecture | Toshihiko Ishiwata |
| 223 | NA | 2026 | 0 | Proof of Goldbach conjecture | Toshihiko Ishiwata |
| 224 | NA | 2026 | 0 | On the Complete Proof of the Strong Goldbach Conjecture | tianyi luo |
| 225 | NA | 2026 | 0 | Goldbach Conjecture (Strong) 1st Way | Taha Muhammad |
| 226 | NA | 2026 | 0 | On the Complete Proof of the Strong Goldbach Conjecture | tianyi luo |
| 227 | NA | 2026 | 0 | Quantum Generation of Natural Numbers and the Goldbach Conjecture | Feng Gao |
| 228 | NA | 2026 | 0 | The Strong Goldbach Conjecture - An Unconditional Proof | Driss BOURAKKADI |
| 229 | NA | 2026 | 0 | Quantum Generation of Natural Numbers and the Goldbach Conjecture | Feng Gao |
| 230 | NA | 2026 | 0 | A Short Elementary Proof of the Goldbach Conjecture | Yoshiki Ueoka |
| 231 | NA | 2026 | 0 | Heuristic Exploration of Prime Pairs in the Strong Goldbach Conjecture | Tóth Máté |
| 232 | NA | 2026 | 0 | An Elementary Transformation Framework for the Goldbach Conjecture | Yoshiki Ueoka |
| 233 | NA | 2026 | 0 | An Elementary Transformation Framework for the Goldbach Conjecture | Yoshiki Ueoka |
| 234 | NA | 2026 | 0 | The Strong Goldbach Conjecture - The Spectral Induction Theorem | Driss BOURAKKADI |
| 235 | NA | 2026 | 0 | The Strong Goldbach Conjecture - The Spectral Induction Theorem | Driss BOURAKKADI |
| 236 | NA | 2026 | 0 | A Complete Proof Framework for the Goldbach Conjecture | 陈文正 |
| 237 | NA | 2026 | 0 | A Short Elementary Proof of the Goldbach Conjecture | Yoshiki Ueoka |
| 238 | NA | 2026 | 0 | Geometric Insights into the Goldbach Conjecture | Frank Vega |
| 239 | NA | 2026 | 0 | A Complete Proof Framework for the Goldbach Conjecture | 陈文正 |
| 240 | NA | 2026 | 0 | Ridzi Butterfly Theory: A Symmetric Visualization & Topological Approach to the Goldbach Conjecture | Ridzi, M Alfa, Ridzi, M Alfa |
| 241 | NA | 2026 | 0 | The Goldbach Conjecture- Density Intersection and the Mandatory Overlap of Prime Waves. | Adrian Neill Pivetta |
| 242 | NA | 2026 | 0 | The Goldbach Conjecture- Density Intersection and the Mandatory Overlap of Prime Waves. | Adrian Neill Pivetta |
| 243 | NA | 2026 | 0 | Ridzi Butterfly Theory: A Symmetric Visualization & Topological Approach to the Goldbach Conjecture | Ridzi, M Alfa, Ridzi, M Alfa |
| 244 | NA | 2026 | 0 | Ridzi Butterfly Theory: A Symmetric Visualization & Topological Approach to the Goldbach Conjecture | Ridzi, M Alfa, Ridzi, M Alfa |
| 245 | NA | 2026 | 0 | Existence Proof of the Goldbach Conjecture Based on Conservation of Additive Symmetry and the Associated Symmetric Sieve | ZhengRong Yin |
| 246 | NA | 2026 | 0 | Existence Proof of the Goldbach Conjecture Based on Conservation of Additive Symmetry and the Associated Symmetric Sieve | ZhengRong Yin |
| 247 | NA | 2026 | 0 | Goldbach Conjecture Proof v3.5 (Main + Density–0 Companion) | Byoungwoo Lee |
| 248 | NA | 2026 | 0 | Structural Failure Mode Analysis of the Binary Goldbach Conjecture | Ioannis N. M. Papadakis |
| 249 | NA | 2026 | 0 | A Spectral–Entropy Framework for the Goldbach Conjecture (v3.8) | Byoungwoo Lee |
| 250 | NA | 2026 | 0 | Deterministic Asymptotic Constraints on the Goldbach Conjecture: The Central Symmetry Model and Tetaton Search Algorithm | Mehmet Akif Kabakçı |
| 251 | NA | 2026 | 0 | Deterministic Asymptotic Constraints on the Goldbach Conjecture: The Central Symmetry Model and Tetaton Search Algorithm | Mehmet Akif Kabakçı |
| 252 | NA | 2026 | 0 | Deterministic Asymptotic Constraints on the Goldbach Conjecture: The Central Symmetry Model and Tetaton Search Algorithm | Kabakçı, Mehmet Akif |
| 253 | NA | 2026 | 0 | Cosmic Evolution Model Based on Möbius Strip with Proofs of Riemann Hypothesis, P≠NP and Goldbach Conjecture | gan |
| 254 | NA | 2026 | 0 | Cosmic Evolution Model Based on Möbius Strip with Proofs of Riemann Hypothesis, P≠NP and Goldbach Conjecture | gan |
| 255 | NA | 2026 | 0 | The Structural Non-Existence of Odd Perfect Numbers under the Strong Goldbach Conjecture | Wang GuoJiang |
| 256 | NA | 2026 | 0 | A Spectral Framework for the Goldbach Conjecture: Natural Boundary Barriers and Winding Invariants | Priyal Bhagwanani |
| 257 | NA | 2026 | 0 | A Spectral Framework for the Goldbach Conjecture: Natural Boundary Barriers and Winding Invariants | Priyal Bhagwanani |
| 258 | NA | 2026 | 0 | Inferring the Goldbach Conjecture under the Truth as Recursive Meta-Nesting Function Paradigm and an Isomorphic Analysis with Perelman's Proof | Jianbing Zhu |
| 259 | NA | 2026 | 0 | The Structural Non-Existence of Odd Perfect Numbers under the Strong Goldbach Conjecture | Wang GuoJiang |
| 260 | NA | 2026 | 0 | From the Goldbach Conjecture to the Riemann Conjecture and the Concept of Ideal Prime Numbers | Van Tuan Tran |
| 261 | NA | 2026 | 0 | The Goldbach Conjecture | Mayibongwe Madisa |
| 262 | NA | 2026 | 0 | A Formal Non-Circular Proof of the Binary Goldbach Conjecture | Samuel Buya Bonaya |
| 263 | NA | 2026 | 0 | The Structural Non-Existence of Odd Perfect Numbers under the Strong Goldbach Conjecture v2 | Wang GuoJiang |
| 264 | NA | 2026 | 0 | A Structural Resolution of the Strong Goldbach Conjecture via Indexed Modular Diagonals | Daniel Augusto Jorge Zafaranich |
| 265 | NA | 2026 | 0 | A Structural Resolution of the Strong Goldbach Conjecture via Indexed Modular Diagonals | Daniel Augusto Jorge Zafaranich |
| 266 | NA | 2026 | 0 | A Proof of the Goldbach Conjecture: Based on Three-Cycles, Three Patterns, and Finiteness of Coverings | kuajiancan Nan |
| 267 | NA | 2026 | 0 | A Proof of the Goldbach Conjecture: Based on Three-Cycles, Three Patterns, and Finiteness of Coverings | kuajiancan Nan |
| 268 | NA | 2026 | 0 | The Weak Goldbach Conjecture | Joseph R. Keen |
| 269 | NA | 2026 | 0 | A Spectral–Entropy Framework for the Goldbach Conjecture (v3.7r6) | Byoungwoo Lee |
| 270 | NA | 2026 | 0 | A Spectral–Entropy Framework for the Goldbach Conjecture (v3.7r4) | Byoungwoo Lee |
| 271 | NA | 2026 | 0 | The Weak Goldbach Conjecture | Joseph R. Keen |
| 272 | NA | 2026 | 0 | A solution to the Goldbach conjecture | Kaya, Furkan |
| 273 | NA | 2026 | 0 | Deterministic Proof of the Strong Goldbach Conjecture: The Binary Prime Partition as a Consequence of the HPHE Universal Identity P = \xi(H)^2 | Richard Cespedes |
| 274 | NA | 2026 | 0 | A solution to the Goldbach conjecture | Furkan Kaya |
| 275 | NA | 2026 | 0 | Proof of the Goldbach Conjecture and TwProof of the Goldbach Conjecture and Twin Prime Conjecture Based on Shui's High-Dimensional Prime Number Theory and the 64-Digit Progressive Cycle of πin Prime Conjecture Based on Shui's High-Dimensional Prime Number Theory and the 64-Digit Progressive Cycle of π | Xiaogang shui |
| 276 | NA | 2026 | 0 | A Structural Finite-Depth Reduction of the Strong Goldbach Conjecture via MSAT and Dyadic Rondo Transport | Yoshihito Matsuura |
| 277 | NA | 2026 | 0 | A Structural Finite-Depth Reduction of the Strong Goldbach Conjecture via MSAT and Dyadic Rondo Transport | Yoshihito Matsuura |
| 278 | NA | 2026 | 0 | Deterministic Proof of the Strong Goldbach Conjecture: The Binary Prime Partition as a Consequence of the HPHE Universal Identity P = \xi(H)^2 | Richard Cespedes |
| 279 | NA | 2026 | 0 | Q-Hot Cache: A High-Throughput Method for Empirical Verification of the Even Goldbach Conjecture | Santhiagu antony raj Parthibanathan |
| 280 | NA | 2026 | 0 | Q-Hot Cache: A High-Throughput Method for Empirical Verification of the Even Goldbach Conjecture | Santhiagu antony raj Parthibanathan |
| 281 | NA | 2026 | 0 | Proof of the Goldbach Conjecture and TwProof of the Goldbach Conjecture and Twin Prime Conjecture Based on Shui's High-Dimensional Prime Number Theory and the 64-Digit Progressive Cycle of πin Prime Conjecture Based on Shui's High-Dimensional Prime Number Theory and the 64-Digit Progressive Cycle of π | Xiaogang shui |
| 282 | NA | 2026 | 0 | The Symmetry of the Axis: A Structural Proof of the Strong Goldbach Conjecture via Radial $d$-Scan and Multi-Front Collision | Guojiang Wang |
| 283 | NA | 2026 | 0 | Generational Emergence of Even Numbers from Cumulative Prime Sumsets: A Structural Analysis Toward the Strong Goldbach Conjecture | Priyal Bhagwanani |
| 284 | NA | 2026 | 0 | Generational Emergence of Even Numbers from Cumulative Prime Sumsets: A Structural Analysis Toward the Strong Goldbach Conjecture | Priyal Bhagwanani |
| 285 | NA | 2026 | 0 | A Sieve-Theoretic Reformulation of the Goldbach Conjecture | Bill Riemers |
| 286 | NA | 2026 | 0 | Goldbach Conjecture via Universal Structure | Elias Oulad Brahim |
| 287 | NA | 2026 | 0 | Goldbach Conjecture via Universal Structure | Elias Oulad Brahim |
| 288 | NA | 2026 | 0 | Zhu-Liang Inevitability of the Goldbach Conjecture | Jianbing zhu |
| 289 | NA | 2026 | 0 | Goldbach Conjecture via Universal Structure | Elias Oulad Brahim |
| 290 | NA | 2026 | 0 | The Goldbach Conjecture as Bilateral Tension Cancellation: Deriving Prime Pair Decomposition from S=2 Manifold Balance Requirements | Geoffrey Howland |
| 291 | NA | 2026 | 0 | The Goldbach Conjecture as Bilateral Tension Cancellation: Deriving Prime Pair Decomposition from S=2 Manifold Balance Requirements | Geoffrey Howland |
| 292 | NA | 2026 | 0 | A Spectral–Entropy Framework for the Goldbach Conjecture: v5.1 Bundle (Main Paper, Density–0 Companion, and Referee Ledger) | Byoungwoo Lee |
| 293 | NA | 2026 | 0 | A Geometric Framework and Complete Proof of the Goldbach Conjecture | Gregory Villines |
| 294 | NA | 2026 | 0 | A Geometric Framework and Complete Proof of the Goldbach Conjecture | Gregory Villines |
| 295 | NA | 2026 | 0 | A Spectral–Entropy Framework for the Goldbach Conjecture (v4.3): Prime-Band Transfer Principle and Most-Window Mixing | Byoungwoo Lee |
| 296 | NA | 2026 | 0 | proof of the goldbach conjecture Based on prime Number Geometry | tianyi luo |
| 297 | NA | 2026 | 0 | proof of the goldbach conjecture Based on prime Number Geometry | tianyi luo |
| 298 | NA | 2026 | 0 | A Non-Circular Inductive Proof of the Binary Goldbach Conjecture | Samuel Bonaya Buya |
| 299 | NA | 2026 | 0 | A Spectral–Entropy Framework for the Goldbach Conjecture (v4.2): Most-Window Mixing via Prime-Band Transfer | Byoungwoo Lee |
| 300 | NA | 2026 | 0 | A Formal Conditional Proof of the Strong Goldbach Conjecture Under the Tα Conservative Extension Axiom System | Version 2.0: Final Compliant Revision | Tianyi Luo |
| 301 | NA | 2026 | 0 | A Formal Conditional Proof of the Strong Goldbach Conjecture Under the Tα Conservative Extension Axiom System | Version 2.0: Final Compliant Revision | Tianyi Luo |
| 302 | NA | 2026 | 0 | Verification of the Goldbach Conjecture Based on SU(4) and the Hodge Conjecture | Yao Zenghao; Doubao |
| 303 | NA | 2026 | 0 | A Structural Proof of the Goldbach Conjecture via Center Value Framework, Factorial Combinatorial Density, and Dynamic Completion Model | 福來 陳 |
| 304 | NA | 2026 | 0 | A Structural Proof of the Goldbach Conjecture via Center Value Framework, Factorial Combinatorial Density, and Dynamic Completion Model | 福來 陳 |
| 305 | NA | 2026 | 0 | A Spectral–Entropy Framework for the Goldbach Conjecture (v3.10r4): Prime-Band Transfer Theorem and Most-Window Polylog Mixing (Main + Density0 Companion) | Byoungwoo Lee |
| 306 | NA | 2026 | 0 | Goldbach Conjecture as a Parallel Prime Oscillator: Circuit Verification to 10^5 | Nobuki Fujimoto |
| 307 | NA | 2026 | 0 | Goldbach Conjecture: Proposal of a Geometric Approach with Holes and Shadows in Odd Numbers | Rodolfo Moroz |
| 308 | NA | 2026 | 0 | A Scalar Product Approach to Strong Goldbach Conjecture and Twin Primes Conjecture | Ezadiin Redwaan |
| 309 | NA | 2026 | 0 | Goldbach Conjecture as a Parallel Prime Oscillator: Circuit Verification to 10^5 | Nobuki Fujimoto |
| 310 | NA | 2026 | 0 | Goldbach Conjecture: Proposal of a Geometric Approach with Holes and Shadows in Odd Numbers | Rodolfo Moroz |
| 311 | NA | 2026 | 0 | A Scalar Product Approach to Strong Goldbach Conjecture and Twin Primes Conjecture | Ezadiin Redwaan |
| 312 | NA | 2026 | 0 | A Scalar Product Approach to Strong Goldbach Conjecture and Twin Primes Conjecture | Ezadiin Redwaan |
| 313 | NA | 2026 | 0 | Goldbach Conjecture: Computational Pattern Detection Through Temporal Dynamics Framework | James Norman Ibbotson |
| 314 | NA | 2026 | 0 | Goldbach Conjecture: Computational Pattern Detection Through Temporal Dynamics Framework | James Norman Ibbotson |
| 315 | NA | 2026 | 0 | An Explicit Threshold for the Binary Goldbach Conjecture in a Prime-Specialized Multiplicative Geometric Model | Jaume Gotanegra |
| 316 | NA | 2026 | 0 | An Explicit Threshold for the Binary Goldbach Conjecture in a Prime-Specialized Multiplicative Geometric Model | Jaume Gotanegra |
| 317 | NA | 2026 | 0 | The Algebraic Vacuum: Zero-Ramification Conductor Model for the Goldbach Conjecture at N = 2ᵏ | Ruqing Chen |
| 318 | NA | 2026 | 0 | The Algebraic Vacuum: Zero-Ramification Conductor Model for the Goldbach Conjecture at N = 2ᵏ | Ruqing Chen |
| 319 | NA | 2026 | 0 | Proof of the Strong Goldbach Conjecture Based on Multiplicative Symmetry Projections and Residual Phase Offsets。 | Haidong Zhang |
| 320 | NA | 2026 | 0 | A Unilateral Framework for the Goldbach Conjecture The Lower-Half Primacy Theorem and WFC-Desert Analysis | 陈文正 |
| 321 | NA | 2026 | 0 | Proof of the Strong Goldbach Conjecture Based on Multiplicative Symmetry Projections and Residual Phase Offsets。 | Haidong Zhang |
| 322 | NA | 2026 | 0 | A Unilateral Framework for the Goldbach Conjecture The Lower-Half Primacy Theorem and WFC-Desert Analysis | 陈文正 |
| 323 | NA | 2026 | 0 | An Optimization Energy Flow Framework for the Goldbach Conjecture: Prime Potential Functions and Energy Minimization Dynamics | Jincheng Zhang |
| 324 | NA | 2026 | 0 | An Optimization Energy Flow Framework for the Goldbach Conjecture: Prime Potential Functions and Energy Minimization Dynamics | Jincheng Zhang |
| 325 | NA | 2026 | 0 | Spectral Gap Operators on the Logarithmic Prime Lattice: Theorems, Mass Gap, and Applications to Goldbach Conjecture | Oleg Glushkov |
| 326 | NA | 2026 | 0 | Spectral Gap Operators on the Logarithmic Prime Lattice: Theorems, Mass Gap, and Applications to Goldbach Conjecture | Oleg Glushkov |
| 327 | NA | 2026 | 0 | Topological Field Partitioning of Prime-Ominoes: A Geometric Isomorphism of the Ternary Goldbach Conjecture and the Generalized 2n-Gap Anchor | Oussama Basta |
| 328 | NA | 2026 | 0 | 论哥德巴赫猜想中的有限确定性与无限不确定性 ——兼谈数论本源的哲学思考 On the Finite Certainty and Infinite Uncertainty in Goldbach Conjecture ——A Philosophical Thinking on the Origin of Number Theory | Hechun Sun |
| 329 | NA | 2026 | 0 | 论哥德巴赫猜想中的有限确定性与无限不确定性 ——兼谈数论本源的哲学思考 On the Finite Certainty and Infinite Uncertainty in Goldbach Conjecture ——A Philosophical Thinking on the Origin of Number Theory | Hechun Sun |
| 330 | NA | 2026 | 0 | Hardy-Littlewood Goldbach Conjecture Validated to N=10^12: From Transient U-Distribution to Ultimate Asymptotic Convergence | Ruqing Chen |
| 331 | NA | 2026 | 0 | Hardy-Littlewood Goldbach Conjecture Validated to N=10^12: From Transient U-Distribution to Ultimate Asymptotic Convergence | Ruqing Chen |
| 332 | NA | 2026 | 0 | The Stability Inequality and Phase Coherence in Goldbach's Field: Physical Analogies and Field Ontology | Oleg Glushkov |
| 333 | NA | 2026 | 0 | Goldbach Hipotezi Üzerine Deterministik Asimptotik Kısıtlamalar: Merkezi Simetri Modeli ve Tetaton Arama Algoritması | Mehmet Akif Kabakçı |
| 334 | NA | 2026 | 0 | The Stability Inequality and Phase Coherence in Goldbach's Field: Physical Analogies and Field Ontology | Oleg Glushkov |
| 335 | NA | 2026 | 0 | The Right Angle | C. Siehien |
| 336 | NA | 2026 | 0 | The Right Angle | C. Siehien |
| 337 | NA | 2026 | 0 | The Right Angle | C. Siehien |
| 338 | NA | 2026 | 0 | The Right Angle | C. Siehien |
| 339 | NA | 2026 | 0 | The Right Angle | C. Siehien |
| 340 | NA | 2026 | 0 | A Geometric Construction for Prime Numbers via Triangular Lattices | Yurii Sherehii |
| 341 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 342 | NA | 2026 | 0 | A Geometric Construction for Prime Numbers via Triangular Lattices | Yurii Sherehii |
| 343 | NA | 2026 | 0 | A Geometric Construction for Prime Numbers via Triangular Lattices | Yurii Sherehii |
| 344 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 345 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 346 | NA | 2026 | 0 | A Unified Structure Theory of Prime Numbers - Conceptual Framework and Fundamental Path | Liang Feng |
| 347 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 348 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 349 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 350 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 351 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 352 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 353 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 354 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 355 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 356 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 357 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 358 | NA | 2026 | 0 | A Geometric Construction for Prime Numbers via Triangular Lattices | Yurii Sherehii |
| 359 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 360 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 361 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 362 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 363 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 364 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 365 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 366 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 367 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 368 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 369 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 370 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 371 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 372 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 373 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 374 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 375 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 376 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 377 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 378 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 379 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 380 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 381 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 382 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 383 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 384 | NA | 2026 | 0 | A Unified Structure Theory of Prime Numbers - Conceptual Framework and Fundamental Path | Liang Feng |
| 385 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 386 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 387 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 388 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 389 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 390 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 391 | NA | 2026 | 0 | Arturo´s criterion for additive prime blocks: A necessary condition based on local density for finite Goldbach closure | ARTURO GOMEZ RODRIGUEZ |
| 392 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 393 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 394 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 395 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Unsoundness of Mathematics | Ralf Wüsthofen |
| 396 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 397 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Unsoundness of Mathematics | Ralf Wüsthofen |
| 398 | NA | 2026 | 0 | Arturo´s criterion for additive prime blocks: A necessary condition based on local density for finite Goldbach closure | ARTURO GOMEZ RODRIGUEZ |
| 399 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Unsoundness of Mathematics | Ralf Wüsthofen |
| 400 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 401 | NA | 2026 | 0 | Packet Concentration and Character Witnesses at the 1∕3 Scale for the Binary Goldbach Problem | Hassan Nasreddine |
| 402 | NA | 2026 | 0 | Packet Concentration and Character Witnesses at the 1∕3 Scale for the Binary Goldbach Problem | Hassan Nasreddine |
| 403 | NA | 2026 | 0 | A Hidden Geometric Order in Goldbach Pairs:Sunflower Helices and Predictive Deviation Clustering | Bouchaib Bahbouhi |
| 404 | NA | 2026 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 405 | NA | 2026 | 0 | A Unified Structure Theory of Prime Numbers - Core Logic and Structural Proofs | Liang Feng |
| 406 | NA | 2026 | 0 | A Unified Structure Theory of Prime Numbers - Core Logic and Structural Proofs | Liang Feng |
| 407 | NA | 2026 | 0 | The Riemann Hypothesis as a Fixed-Point Phenomenon: Structural Parallels with Incompleteness and Undecidability | Dana Ballinger |
| 408 | NA | 2026 | 0 | The Riemann Hypothesis as a Fixed-Point Phenomenon: Structural Parallels with Incompleteness and Undecidability | Dana Ballinger |
| 409 | NA | 2026 | 0 | The Universal Dissipative Margin: From Millennium Prize Problems to General Relativity and Sovereign AGI Dynamics | Rony Charlier |
| 410 | NA | 2026 | 0 | Telescopic Mapping and the Datamatic Synchronization of Primes: Applications to Goldbach, Twin Primes, and the Riemann Hypothesis | Adhrit Mohan Sahai |
| 411 | NA | 2026 | 0 | The Universal Dissipative Margin: From Millennium Prize Problems to General Relativity and Sovereign AGI Dynamics | Rony Charlier |
| 412 | NA | 2026 | 0 | Telescopic Mapping and the Datamatic Synchronization of Primes: Applications to Goldbach, Twin Primes, and the Riemann Hypothesis | Adhrit Mohan Sahai |
| 413 | NA | 2026 | 0 | The Unitary Reference Principle: A Foundational Reform of Quantitative Mathematics | Joshua Brogley |
| 414 | NA | 2026 | 0 | A New Arithmetic Manifold Framework: The Alpha Ring–Tα Theory and Its Applications to Classic Prime Problems | tianyi luo |
| 415 | NA | 2026 | 0 | The abc Conjecture Resolution: A Structural Proof via the HPHE Framework and Primes Sphere Geometry | Richard Cespedes |
| 416 | NA | 2026 | 0 | The abc Conjecture Resolution: A Structural Proof via the HPHE Framework and Primes Sphere Geometry | Richard Cespedes |
| 417 | NA | 2026 | 0 | The Limits of Arithmetic Language: A Philosophical and Structural Preface to the Prime-Index Isomorphic Arithmetic | Ruqing Chen |
| 418 | NA | 2026 | 0 | The Limits of Arithmetic Language: A Philosophical and Structural Preface to the Prime-Index Isomorphic Arithmetic | Ruqing Chen |
| 419 | NA | 2026 | 0 | A New Arithmetic Manifold Framework: The Alpha Ring–Tα Theory and Its Applications to Classic Prime Problems | tianyi luo |
| 420 | NA | 2026 | 0 | Shifted Primes and Spectral Detection of Riemann Zeros. Extended Spectral Analysis via Transfer Operator, Lomb–Scargle Periodogram and Autocorrelation Evidence | Ibar Federico Anderson |
| 421 | NA | 2026 | 0 | The Goldbach Mirror II: Geometric Foundations of Conductor Rigidity and the Static Conduit in GSp(4) | Ruqing Chen |
| 422 | NA | 2026 | 0 | The Goldbach Mirror II: Geometric Foundations of Conductor Rigidity and the Static Conduit in GSp(4) | Ruqing Chen |
| 423 | NA | 2026 | 0 | The Geometry of Prime Conjectures - Unified Resolution via Torsion Singularity Theory | Fathom Asher; Kimberley Asher |
| 424 | NA | 2026 | 0 | Goldbach-like Additive Closure Under Global Phase Correlations: Numerical Evidence at Fixed Density | Laurent Danion |
| 425 | NA | 2026 | 0 | with explicit prime-in-short-interval bounds in the endgame | Yoshiki Ueoka |
| 426 | NA | 2026 | 0 | The Geometry of Prime Conjectures - Unified Resolution via Torsion Singularity Theory | Fathom Asher; Kimberley Asher |
| 427 | NA | 2026 | 0 | Conjecture de Goldbach : approche spectrale et stratégies hybrides | Hademine Ahmed; Vall Ekhyar |
| 428 | NA | 2026 | 0 | Goldbach-like Additive Closure Under Global Phase Correlations: Numerical Evidence at Fixed Density | Laurent Danion |
| 429 | NA | 2026 | 0 | Spiral geometry, laminated arms and Kloosterman dispersion for Goldbach - An Archimedean–modular formulation with an eff ective threshold matched to the computational boundary | Stefano Rivis |
| 430 | NA | 2026 | 0 | Major Conjectures and Cosmological Tests B; Prime Distribution from the Perspective of Physical Information | changzheng zhou; ziqing zhou |
| 431 | NA | 2026 | 0 | Major Conjectures and Cosmological Tests B; Prime Distribution from the Perspective of Physical Information | changzheng zhou; ziqing zhou |
| 432 | NA | 2026 | 0 | Spiral geometry, laminated arms and Kloosterman dispersion for Goldbach - An Archimedean–modular formulation with an eff ective threshold matched to the computational boundary | Stefano Rivis |
| 433 | NA | 2026 | 0 | The Pan-Matrix Configuration Universe: A Computable Framework for Unified Mathematical Foundations | Yue Wang |
| 434 | NA | 2026 | 0 | The Pan-Matrix Configuration Universe: A Computable Framework for Unified Mathematical Foundations | Yue Wang |
| 435 | NA | 2026 | 0 | The Unitary Reference Principle: A Foundational Reform of Quantitative Mathematics | Joshua Brogley |
| 436 | NA | 2026 | 0 | Design of Extended Weil Code Families via Goldbach-Based Prime Concatenation for LEO-PNT Systems | Jae Duk Yoo; Seungsoo Yoo; Ju-Hyun Maeng; Gyu-In Jee; Sun Yong Kim |
| 437 | NA | 2026 | 0 | Structural Scope, Negative Results, and Epistemic Stop Conditions An Author's Note on the Limits of the ARG Framework | Łukasz Bojanowski |
| 438 | NA | 2026 | 0 | Structural Scope, Negative Results, and Epistemic Stop Conditions An Author's Note on the Limits of the ARG Framework | Łukasz Bojanowski |
| 439 | NA | 2026 | 0 | Major Conjectures and Cosmological Tests F; The Cosmological Falsifiability of Goldbach's Even Partition | changzheng zhou; zhou, changzheng |
| 440 | NA | 2026 | 0 | The Ternary Conductor Boundary: Why Conductor Rigidity Is Specific to the Binary Goldbach Problem | Ruqing Chen |
| 441 | NA | 2026 | 0 | The Ternary Conductor Boundary: Why Conductor Rigidity Is Specific to the Binary Goldbach Problem | Ruqing Chen |
| 442 | NA | 2026 | 0 | Major Conjectures and Cosmological Tests F; The Cosmological Falsifiability of Goldbach's Even Partition | changzheng zhou; zhou, changzheng |
| 443 | NA | 2026 | 0 | The Unity of the Truth as Recursive Meta-Nesting Function Paradigm: A Meta-Level Survey of Cross-Domain Mathematical Theorems | Jianbing Zhu |
| 444 | NA | 2026 | 0 | The No-Gap Theorem: Goldbach in the Hyperbolic Plane | Ray Overholser |
| 445 | NA | 2026 | 0 | Spectral Circle Method for Goldbach's Conjecture | Oleg Glushkov |
| 446 | NA | 2026 | 0 | Goldbach via Spectral–Entropy Mixing: Exact Core, Density–0 Closure Companion, and Conditional Global Completion Interface (v5.0) | Byoungwoo Lee |
| 447 | NA | 2026 | 0 | Conjectures on Sums of Consecutive Primes | Edwige Tolla |
| 448 | NA | 2026 | 0 | Conjectures on Sums of Consecutive Primes | Edwige Tolla |
| 449 | NA | 2026 | 0 | Spectral Circle Method for Goldbach's Conjecture | Oleg Glushkov |
| 450 | NA | 2026 | 0 | Metaformalism and Meta-Existence: Fractal Structure, Bidirectional Dynamics, and Geometric Operators of Phase Selection | David Sepiashvili |
| 451 | NA | 2026 | 0 | A Proof of the Twin Prime Conjecture | Gregory Villines |
| 452 | NA | 2026 | 0 | Metaformalism and Meta-Existence: Fractal Structure, Bidirectional Dynamics, and Geometric Operators of Phase Selection | David Sepiashvili |
| 453 | NA | 2026 | 0 | A Proof of the Twin Prime Conjecture | Gregory Villines |
| 454 | NA | 2026 | 0 | Teorema de Caracterización de los números primos_Characterization Theorem for Prime Numbers | Fernando Domínguez Casares |
| 455 | NA | 2026 | 0 | Teorema de Caracterización de los números primos_Characterization Theorem for Prime Numbers | Fernando Domínguez Casares |
| 456 | NA | 2026 | 0 | Self-Similar Structure in Goldbach Deviations: L-Function Zeros and the Twin Prime Signature | Ruqing Chen |
| 457 | NA | 2026 | 0 | Paramodular Conjecture for the Goldbach–Frey Jacobian: From GSp(4) to Bianchi Modularity via Weil Restriction | Ruqing Chen |
| 458 | NA | 2026 | 0 | Paramodular Conjecture for the Goldbach–Frey Jacobian: From GSp(4) to Bianchi Modularity via Weil Restriction | Ruqing Chen |
| 459 | NA | 2026 | 0 | ρ-Conservation: The Ineliminability Law of the Remainder across the Layer Hierarchy / ρ守恒:余项沿层级链的不灭定律 | Han Qin |
| 460 | NA | 2026 | 0 | Self-Similar Structure in Goldbach Deviations: L-Function Zeros and the Twin Prime Signature | Ruqing Chen |
| 461 | NA | 2026 | 0 | ρ-Conservation: The Ineliminability Law of the Remainder across the Layer Hierarchy / ρ守恒:余项沿层级链的不灭定律 | Han Qin |
| 462 | NA | 2026 | 0 | Numerical Evidence for Linear Scaling Laws in Goldbach-induced Oscillator Networks | Hristo Nedelchev |
| 463 | NA | 2026 | 0 | A Coupled Oscillator Framework for RH and Goldbach | Petřina Jaroslav |
| 464 | NA | 2026 | 0 | Complete Characterization of Overlap Structure in Goldbach Representations: The Modulo 3 Phenomenon and Deterministic Unit Deviation | Ahmed Waleed Ahmed |
| 465 | NA | 2026 | 0 | Complete Characterization of Overlap Structure in Goldbach Representations: The Modulo 3 Phenomenon and Deterministic Unit Deviation | Ahmed Waleed Ahmed |
| 466 | NA | 2026 | 0 | A Coupled Oscillator Framework for RH and Goldbach | Petřina Jaroslav |
| 467 | NA | 2026 | 0 | Goldbach Program v4.0 (Main + Companion): Prime-Band Transfer Theorem, Most-Window Polylog Mixing, and Density–0 Closure (EG) | Byoungwoo Lee |
| 468 | NA | 2026 | 0 | A Draft Term Model for ρ-Arithmetic: First Steps toward a History-Preserving Arithmetic Framework / ρ-算术的项模型草案:保留操作历史的算术框架初探 | Han Qin |
| 469 | NA | 2026 | 0 | Goldbach Program v4.0 (Main + Companion): Prime-Band Transfer Theorem, Most-Window Polylog Mixing, and Density–0 Closure (EG) | Byoungwoo Lee |
| 470 | NA | 2026 | 0 | A Draft Term Model for ρ-Arithmetic: First Steps toward a History-Preserving Arithmetic Framework / ρ-算术的项模型草案:保留操作历史的算术框架初探 | Han Qin |
| 471 | NA | 2026 | 0 | The Safe Residue Class Sieve Method: Unconditional Proofs of the Twin Prime Conjecture, Polignac's Conjecture, and Goldbach's Conjecture 安全剩余类筛法——孪生素数猜想、Polignac 猜想与哥德巴赫猜想的无条件证明 | Xⅰngmⅰng Lⅰu |
| 472 | NA | 2026 | 0 | The Safe Residue Class Sieve Method: Unconditional Proofs of the Twin Prime Conjecture, Polignac's Conjecture, and Goldbach's Conjecture 安全剩余类筛法——孪生素数猜想、Polignac 猜想与哥德巴赫猜想的无条件证明 | Xⅰngmⅰng Lⅰu |
| 473 | NA | 2026 | 0 | Complete Characterization of Overlap Structure in Goldbach Representations: The Modulo 3 Phenomenon and Deterministic Unit Deviation | Ahmed Waleed Ahmed |
| 474 | NA | 2026 | 0 | Complete Proof of the Riemann Hypothesis and the Unified Number Theoretic Architecture of the 600-Cell: Goldbach, Twin Primes, and Collatz | Morató de Dalmases, Luis |
| 475 | NA | 2026 | 0 | Complete Proof of the Riemann Hypothesis and the Unified Number Theoretic Architecture of the 600-Cell: Goldbach, Twin Primes, and Collatz | Luis Morató de Dalmases |
| 476 | NA | 2026 | 0 | Complete Proof of the Riemann Hypothesis and the Unified Number Theoretic Architecture of the 600-Cell: Goldbach, Twin Primes, and Collatz | Morató de Dalmases, Luis |
| 477 | NA | 2026 | 0 | Complete Proof of the Riemann Hypothesis and the Unified Number Theoretic Architecture of the 600-Cell: Goldbach, Twin Primes, and Collatz | Luis Morató de Dalmases |
| 478 | NA | 2026 | 0 | The Goldbach–Riemann Bridge for Shifted Primes. Analytic Structure, the Singular-Factor Constant <em>S</em>∞, Explicit Formula for Ψ*(x), and Extensive Computational Verification to p<6.79×10<sup>7</sup>, p~10<sup>38</sup>, p~10<sup>154</sup>, and RSA Scales up to ~10<sup>617</sup> | Ibar Federico Anderson |
| 479 | NA | 2026 | 0 | Numerical Evidence for Linear Scaling Laws in Goldbach-induced Oscillator Networks | Nedelchev, Hristo |
| 480 | NA | 2026 | 0 | Numerical Evidence for Linear Scaling Laws in Goldbach-induced Oscillator Networks | Hristo Nedelchev |
| 481 | NA | 2026 | 0 | The golden vein: Generating sets K are complete additive bases of order 2. On the representation of natural numbers as sums of pairs of indices of primes | Andrei Fedotkin |
| 482 | NA | 2026 | 0 | Numerical Evidence for Linear Scaling Laws in Goldbach-induced Oscillator Networks | Hristo Nedelchev |
| 483 | NA | 2026 | 0 | The golden vein: Generating sets K are complete additive bases of order 2. On the representation of natural numbers as sums of pairs of indices of primes | Andrei Fedotkin |
| 484 | NA | 2026 | 0 | The golden vein: Generating sets K are complete additive bases of order 2. On the representation of natural numbers as sums of pairs of indices of primes | Andrei Fedotkin |
| 485 | NA | 2026 | 0 | On the Unified Principle of Compatibility and Existence in Mathematical Structures | Xing Wang |
| 486 | NA | 2026 | 0 | On the Unified Principle of Compatibility and Existence in Mathematical Structures | Xing Wang |
| 487 | NA | 2026 | 0 | Numerical Evidence for Linear Scaling Laws in Goldbach-induced Oscillator Networks | Hristo Nedelchev |
| 488 | NA | 2026 | 0 | MODULAR OBSTRUCTIONS, STRUCTURED FAILURE SETS AND PERSISTENCE PHENOMENA IN ARITHMETIC PROGRESSIONS OF SHIFTED GOLDBACH PRIMES. | Christoper Muoki Mututu |
| 489 | NA | 2026 | 0 | The Goldbach Mirror: Conductor Rigidity and the Static Conduit in GSp(4) | Ruqing Chen |
| 490 | NA | 2026 | 0 | The Goldbach Mirror: Conductor Rigidity and the Static Conduit in GSp(4) | Ruqing Chen |
| 491 | NA | 2026 | 0 | The Goldbach–Riemann bridge for shifted primes: Analytic structure, the singular-factor constant S∞, explicit formula for Ψ^* (x), and extensive computational verification to p<6.79×10^7, p∼10^38, p∼10^154, and RSA scales up to ∼10^617 | Ibar Federico Anderson |
| 492 | NA | 2026 | 0 | Shifted Primes, Restricted Goldbach Sums, and Spectral Detection of Riemann Zeros | Ibar Federico Anderson |
| 493 | NA | 2026 | 0 | MODULAR OBSTRUCTIONS AND CONSTANT DENSITY FAILURE PHENOMENA IN ARITHMETIC PROGRESSIONS OF SHIFTED GOLDBACH PRIMES. | Christoper Muoki Mututu |
| 494 | NA | 2026 | 0 | A smoothed Perron bound for two-point Liouville correlations via Sobolev regularity at σ = 1 | Theodore Deligiannis |
| 495 | NA | 2026 | 0 | A smoothed Perron bound for two-point Liouville correlations via Sobolev regularity at σ = 1 | Theodore Deligiannis |
| 496 | NA | 2026 | 0 | MODULAR OBSTRUCTIONS AND CONSTANT DENSITY FAILURE PHENOMENA IN ARITHMETIC PROGRESSIONS OF SHIFTED GOLDBACH PRIMES. | Christoper Muoki Mututu |
| 497 | NA | 2026 | 0 | A smoothed Perron bound for two-point Liouville correlations via Sobolev regularity at σ = 1 | Theodore Deligiannis |
| 498 | NA | 2026 | 0 | Shifted Primes, Restricted Goldbach Sums, and Spectral Detection of Riemann Zeros | Ibar Federico Anderson |
| 499 | NA | 2026 | 0 | MODULAR OBSTRUCTIONS AND CONSTANT DENSITY FAILURE PHENOMENA IN ARITHMETIC PROGRESSIONS OF SHIFTED GOLDBACH PRIMES. | Christoper Muoki Mututu |
| 500 | NA | 2026 | 0 | A smoothed Perron bound for two-point Liouville correlations via Sobolev regularity at σ = 1 | Theodore Deligiannis |
| 501 | NA | 2026 | 0 | MODULAR OBSTRUCTIONS AND CONSTANT DENSITY FAILURE PHENOMENA IN ARITHMETIC PROGRESSIONS OF SHIFTED GOLDBACH PRIMES. | Christoper Muoki Mututu |
| 502 | NA | 2026 | 0 | The Unitary Reference Principle: A Foundational Reform of Quantitative Mathematics | Joshua Brogley |
| 503 | NA | 2026 | 0 | Prime Pairs, Quartic Factorizations, and the Arithmetic of Z[i]: From 2=1+1 to a Chen-Type Theorem for Primorials | Bangcheng Wang |
| 504 | NA | 2026 | 0 | The Unitary Reference Principle: A Foundational Reform of Quantitative Mathematics | Joshua Brogley |
| 505 | NA | 2026 | 0 | Kolcakoglu-Frequenzprinzip: F(n) = 1/n – Primzahlen als irreduzible Frequenzen im beschraenkten Raum (0,1] und neue Formulierungen der Goldbach-Vermutung, der Riemannschen Hypothese und P vs NP | A. Kolçakoglu |
| 506 | NA | 2026 | 0 | Kolcakoglu-Frequenzprinzip: F(n) = 1/n – Primzahlen als irreduzible Frequenzen im beschraenkten Raum (0,1] und neue Formulierungen der Goldbach-Vermutung, der Riemannschen Hypothese und P vs NP | A. Kolçakoglu |
| 507 | NA | 2026 | 0 | Multiplicity and Structure of Prime Numbers | Ibar Federico Anderson |
| 508 | NA | 2026 | 0 | Unified Verification of Three Major Mathematical Problems Based on the Taiji-Möbius Loop Architecture | gan |
| 509 | NA | 2026 | 0 | Unified Verification of Three Major Mathematical Problems Based on the Taiji-Möbius Loop Architecture | gan |
| 510 | NA | 2026 | 0 | The φ-Eigengeometry of Prime Pairs | Eric McLean |
| 511 | NA | 2026 | 0 | The φ-Eigengeometry of Prime Pairs | Eric McLean |
| 512 | NA | 2026 | 0 | A Framework for Goldbach's Conjecture via Golden Ratio Sieve Structure | Eric McLean |
| 513 | NA | 2026 | 0 | A smoothed Perron bound for two-point Liouville correlations via Sobolev regularity at σ = 1 | Theodore Deligiannis |
| 514 | NA | 2026 | 0 | A smoothed Perron bound for two-point Liouville correlations via Sobolev regularity at σ = 1 | Theodore Deligiannis |
| 515 | NA | 2026 | 0 | A smoothed Perron bound for two-point Liouville correlations via Sobolev regularity at σ = 1 | Theodore Deligiannis |
| 516 | NA | 2026 | 0 | Prime Pairs, Quartic Factorizations, and the Arithmetic of Z[i]: From 2=1+1 to a Chen-Type Theorem for Primorials | Bangcheng Wang |
| 517 | NA | 2026 | 0 | Prime Pairs, Quartic Factorizations, and the Arithmetic of Z[i]: From 2=1+1 to a Chen-Type Theorem for Primorials | Bangcheng Wang |
| 518 | NA | 2026 | 0 | Prime Pairs, Quartic Factorizations, and the Arithmetic of Z[i]: From 2=1+1 to a Chen-Type Theorem for Primorials | Bangcheng Wang |
| 519 | NA | 2026 | 0 | Power Sum Divisibility, the Proton Lattice Position, and the Erdős-Moser Framework Through the 144 Harmonic Egyptian Fractions, Goldbach Decompositions, Collatz Sequences, Prime Gaps, and Arithmetic Progressions Through the 144-Lattice | Griff gurwell |
| 520 | NA | 2026 | 0 | Power Sum Divisibility, the Proton Lattice Position, and the Erdős-Moser Framework Through the 144 Harmonic Egyptian Fractions, Goldbach Decompositions, Collatz Sequences, Prime Gaps, and Arithmetic Progressions Through the 144-Lattice | Griff gurwell |
| 521 | NA | 2026 | 0 | Prime Pairs, Quartic Factorizations, and the Arithmetic of Z[i]: From 2=1+1 to a Chen-Type Theorem for Primorials | Bangcheng Wang |
| 522 | NA | 2026 | 0 | A Central Window Algorithm for Explicit Goldbach Representations Certified Examples Up To 10^700 | Bouchaib Bahbouhi |
| 523 | NA | 2026 | 0 | A Central Window Algorithm for Explicit Goldbach Representations Certified Examples Up to 10^700 | Bouchaib Bahbouhi |
| 524 | NA | 2026 | 0 | GoldbachGPU: An Open Source GPU-Accelerated Framework for Verification of Goldbach's Conjecture | Isaac Llorente Saguer |
| 525 | NA | 2026 | 0 | Spectral Signatures of the Riemann Zeta Function in Shifted-Prime Residuals: Amplification Factor | Ibar Federico Anderson |
| 526 | NA | 2026 | 0 | Goldbach Representations of Shifted Primes: Structure, Computation, Singular-Factor Bias, and Extended Computations to p<6.79×10<SUP>7</SUP> | Ibar Federico Anderson |
| 527 | NA | 2026 | 0 | Goldbach Representations of Shifted Primes: Structure, Computation, Singular-Factor Bias, and Extended Computations to <em>p</em><6.79×10<sup>7</sup> | Ibar Federico Anderson |
| 528 | NA | 2026 | 0 | Density-based structural frameworks for prime numbers, prime gaps, and Euler products | Gregorio Vettori |
| 529 | NA | 2026 | 0 | A Lock-Free, Fully GPU-Resident Architecture for the Verification of Goldbach's Conjecture | Isaac Llorente Saguer |
| 530 | NA | 2026 | 0 | The DNA of the Harmonized Sophie Germain and Twin Primes | Jan Feliksiak; Monica Feliksiak |
| 531 | NA | 2026 | 0 | Goldbach’s Conjecture as an Informational Coherence Phenomenon | Raoul Bianchetti |
| 532 | NA | 2026 | 0 | Goldbach’s Conjecture as an Informational Coherence Phenomenon | Raoul Bianchetti |
| 533 | NA | 2026 | 0 | Об элементарном методе решения бинарной гипотезы Гольдбаха | Андрей Федоткин |
| 534 | NA | 2026 | 0 | An Explicit Result for the Sum of Two Almost Primes | Adrian Dudek; LACHLAN DUNN |
| 535 | NA | 2026 | 0 | Weakening the Legendre Conjecture | Marc Chamberland; Armin Straub |
| 536 | NA | 2026 | 0 | Cross-Domain Stress-Testing of the AM-Regulator | Savio Antonio Vogt |
| 537 | NA | 2026 | 0 | Conjecture About the Composition of Prime Numbers | Rafael Garcia-Sandoval |
| 538 | NA | 2026 | 0 | Generalized Mersenne Numbers and Prime Number Generation | Ramon Carbó-Dorca; Krishnan Balasubramaniam |
| 539 | NA | 2026 | 0 | From Littlewood and Fujii to Riemann | Huan Xiao |
| 540 | NA | 2026 | 0 | On Frobenius Numbers of Shifted Power Sequences | Feihu Liu; Guoce Xin |
| 541 | NA | 2026 | 0 | A Quadratic Root-Difference Approach to Goldbach Partitions | Shang Yu Chen |
| 542 | NA | 2026 | 0 | On a Möbius double sum | Olivier Ramaré; Sebastian Zuniga-Alterman |
| 543 | NA | 2026 | 0 | LA CONJETURA DE GOLDBACH DESDE LA PERSPECTIVA DE LOS FACTORES PRIMOS IMPARES DE UN NÚMERO PAR | Imanol Urcola |
| 544 | NA | 2026 | 0 | The Contraction Lens: Observation Scales and Non-Injective Operations Across Mathematics and Physics | Wurm M.C. |
| 545 | NA | 2026 | 0 | Goldbach–Linnik type problems with one prime square and six prime cubes | Xue Han |
| 546 | NA | 2026 | 0 | On the discrete convolution of the Liouville and Möbius functions | Marco Cantarini; Alessandro Gambini; Alessandro Zaccagnini |
| 547 | NA | 2026 | 0 | Compression is all you need: Modeling Mathematics | Vitaly Aksenov; Eve Bodnia; Michael H. Freedman; Michael Mulligan |
| 548 | NA | 2026 | 0 | On Covering Irreducibility and Two-Loop Structures in the Goldbach Problem | Jeong Min Yeon |
| 549 | NA | 2026 | 0 | On Covering Irreducibility and Two-Loop Structures in the Goldbach Problem | Jeong Min Yeon |
| 550 | NA | 2026 | 0 | On Covering Irreducibility and Two-Loop Structures in the Goldbach Problem | Jeong Min Yeon |
| 551 | NA | 2026 | 0 | On Covering Irreducibility and Two-Loop Structures in the Goldbach Problem | Jeong Min Yeon |
| 552 | NA | 2026 | 0 | On the Binary Goldbach Problem in a Prime-Specialized Multiplicative Geometric Model | Gotanegra Jaume |
| 553 | NA | 2026 | 0 | On the Binary Goldbach Problem in a Prime-Specialized Multiplicative Geometric Model | Gotanegra Jaume |
| 554 | NA | 2026 | 0 | A Translation of the Goldbach Problem into a Dynamical System and a Classification of Fixed Points | Yoshiki Ueoka |
| 555 | NA | 2026 | 0 | A Translation of the Goldbach Problem into a Dynamical System and a Classification of Fixed Points | Yoshiki Ueoka |
| 556 | NA | 2026 | 0 | The Waring-Goldbach Problem | Joseph R. Keen |
| 557 | NA | 2026 | 0 | The Waring-Goldbach Problem | Joseph R. Keen |
| 558 | NA | 2026 | 0 | On some Waring–Goldbach problems | Geovane Matheus Lemes Andrade |
| 559 | NA | 2026 | 0 | On the Synthetic Nature of the Goldbach Problem | Dmitri Deryabin |
| 560 | NA | 2026 | 0 | On the Synthetic Nature of the Goldbach Problem | Dmitri Deryabin |
| 561 | NA | 2026 | 0 | The Goldbach Problem for Primorials: Singular Series, Type II Sums, and LPF Structure | Michael Ross |
| 562 | NA | 2026 | 0 | The Goldbach Problem for Primorials: Singular Series, Type II Sums, and LPF Structure | Michael Ross |
| 563 | NA | 2026 | 0 | Waring-Goldbach problems for one square and higher powers | Geovane Matheus Lemes Andrade |
| 564 | NA | 2026 | 0 | On Symmetry, Bilinear Structures, and Semiprime Approximations in the Goldbach Problem | عبدالرحمن صفوت صابر |
| 565 | NA | 2026 | 0 | On the quadratic Waring-Goldbach problem with primes in Piatetski-Shapiro sets | Meng Gao; Jinjiang Li; Linji Long; Min Zhang |
| 566 | NA | 2026 | 0 | Waring-Goldbach problems for one square and higher powers | Geovane Matheus Lemes Andrade |
| 567 | NA | 2026 | 0 | On the quadratic Waring-Goldbach problem with primes in Piatetski-Shapiro sets | Meng Gao; Jinjiang Li; Linji Long; Min Zhang |
| 568 | NA | 2026 | 0 | Oscillatory Filtering Operators and Their Limitations in the Goldbach Problem: A Negative Result and a Multiplicative Weight Construction | Arnaldo Adrian Ozorio Olea |
| 569 | NA | 2026 | 0 | Oscillatory Filtering Operators and Their Limitations in the Goldbach Problem: A Negative Result and a Multiplicative Weight Construction | Arnaldo Adrian Ozorio Olea |
| 570 | NA | 2026 | 0 | Multiple Gauss sums | Jianya Liu; Sizhe Xie |
| 571 | NA | 2026 | 0 | Multiple Gauss sums | Jianya Liu; Sizhe Xie |
| 572 | NA | 2026 | 0 | Prime Curvature Geometry and the Structure of Additive Prime Deviations | Bill Riemers |
| 573 | NA | 2026 | 0 | Prime Curvature Geometry and the Structure of Additive Prime Deviations | Bill Riemers |
| 574 | NA | 2026 | 0 | Prime Curvature Geometry and the Structure of Additive Prime Deviations | Bill Riemers |
| 575 | NA | 2026 | 0 | Prime Curvature Geometry and the Structure of Additive Prime Deviations | Bill Riemers |
| 576 | NA | 2026 | 0 | Prime Curvature Geometry and the Structure of Additive Prime Deviations | Bill Riemers |
| 577 | NA | 2026 | 0 | Prime Curvature Geometry and the Structure of Additive Prime Deviations | Bill Riemers |
| 578 | NA | 2026 | 0 | A Diophantine inequality with five squares of Piatetski-Shapiro primes | S. I. Dimitrov |
| 579 | NA | 2026 | 0 | A density theorem for higher-order sums of prime numbers | Michael T. Lacey; Hamed Mousavi; Yaghoub Rahimi; Manasa N. Vempati |
| 580 | NA | 2026 | 0 | Shifted multiplicative subgroups are not ratio sets | Seoyoung Kim; Chi Hoi Yip; Semin Yoo |
| 581 | NA | 2026 | 0 | Diophantine approximation with two squares and three biquadrates of primes | Yu Fu; Liqun Hu; Siqi Liu; Li Yang |
| 582 | NA | 2026 | 0 | Sieving with square conditions and applications to Hilbert cubes in arithmetic sets | Rainer Dietmann; Christian Elsholtz; Imre Z. Ruzsa |
| 583 | NA | 2026 | 0 | A Diophantine inequality with one prime of the form | Yukun Liu; Jing Huang |
| 584 | NA | 2026 | 0 | The exceptional set for Diophantine inequality with mixed powers of primes | Yu Fu; 福临 祝; Liqun Hu |
| 585 | NA | 2026 | 0 | A system of two Diophantine inequalities with primes | Yanjun Dong; Qian Wang |
| 586 | NA | 2026 | 0 | Diophantine tuples and product sets in shifted powers | Ernie Croot; Chi Hoi Yip |
| 587 | NA | 2026 | 0 | Almost primes and primes that are sums of two squares plus 1 | Kunjakanan Nath; Likun Xie |
| 588 | NA | 2026 | 0 | The Wiener Wintner and Return Times Theorem Along the Primes | Jan Fornal; Anastasios Fragkos; Ben Krause; Lacey, Michael; Hamed Mousavi; Yu-Ch |
| 589 | NA | 2026 | 0 | Numerical Computations Concerning Landau-Siegel Zeros | Rick F. Lu; Asif Zaman; Haonan Zhao |
| 590 | NA | 2026 | 0 | A Proof of Goldbach's Conjecture via the Golden Ratio Numeral System | Lin Hao |
| 591 | NA | 2026 | 0 | A Proof of Goldbach's Conjecture via the Golden Ratio Numeral System | Lin Hao |
| 592 | NA | 2026 | 0 | A Proof of Goldbach's Conjecture via the Golden Ratio Numeral System | Lin Hao |
| 593 | NA | 2026 | 0 | Infinite Fractal Descent and the Geometric Origins of Prime Distribution: A Topological Derivation of Goldbach's Conjecture | Enkhamgalan Nasanjargal |
| 594 | NA | 2026 | 0 | A Lock-Free, Fully GPU-Resident Architecture for the Verification of Goldbach's Conjecture | Isaac Llorente Saguer |
| 595 | NA | 2026 | 0 | Infinite Fractal Descent and the Geometric Origins of Prime Distribution: A Topological Derivation of Goldbach's Conjecture | Enkhamgalan Nasanjargal |
| 596 | NA | 2026 | 0 | Goldbach's Conjecture | Joseph R. Keen |
| 597 | NA | 2026 | 0 | Goldbach's Conjecture | Joseph R. Keen |
| 598 | NA | 2026 | 0 | Goldbach's Conjecture via Two-Residue Sieve Dynamics and Spectral Independence | Craig Colenso |
| 599 | NA | 2026 | 0 | Goldbach's Conjecture via Two-Residue Sieve Dynamics and Spectral Independence | Craig Colenso |
| 600 | NA | 2026 | 0 | GoldbachGPU: An Open Source GPU-Accelerated Framework for Verification of Goldbach's Conjecture | Isaac Llorente Saguer |
| 601 | NA | 2026 | 0 | Resolution of Goldbach's conjecture | Wadï Mami |
| 602 | NA | 2026 | 0 | The Inheritance Theory of 3 and 7: Structural Proof of Goldbach's Conjecture through Oscillatory Models in the Modulo 6 System | Saeedi Samane |
| 603 | NA | 2026 | 0 | INFERRING GOLDBACH'S CONJECTURE | David D Jones; Thomas Ogilvy; Boston Ma; St Paul MN |
| 604 | NA | 2026 | 0 | The Inheritance Theory of 3 and 7: Structural Proof of Goldbach's Conjecture through Oscillatory Models in the Modulo 6 System | Saeedi Samane |
| 605 | NA | 2026 | 0 | A Proof of Goldbach's Conjecture | Uchikawa Kiyoshi |
| 606 | NA | 2026 | 0 | A Proof of Goldbach's Conjecture | Uchikawa Kiyoshi |
| 607 | NA | 2026 | 0 | Density, Verification, and Goldbach's Conjecture | Taylor(Texas ID: 43510920, DOB: 05/21/2002), Nicholas Micah; Sovereign Pattern L |
| 608 | NA | 2026 | 0 | Prime-Shade Duality and Goldbach's Conjecture: The Wästlund Reflection on RP^1 | Paul Buchanan |
| 609 | NA | 2026 | 0 | Prime-Shade Duality and Goldbach's Conjecture: The Wästlund Reflection on RP^1 | Paul Buchanan |
| 610 | NA | 2026 | 0 | Density, Verification, and Goldbach's Conjecture | Taylor(Texas ID: 43510920, DOB: 05/21/2002), Nicholas Micah; Sovereign Pattern L |
| 611 | NA | 2026 | 0 | Goldbach's conjecture - Complete Proof | Maximus Shlygin |
| 612 | NA | 2026 | 0 | Goldbach's conjecture - Complete Proof | Maximus Shlygin |
| 613 | NA | 2026 | 0 | My proof of Goldbach's conjecture | Aliaksandr Hamolin |
| 614 | NA | 2026 | 0 | My proof of Goldbach's conjecture | Aliaksandr Hamolin |
| 615 | NA | 2026 | 0 | A SIEVE-COMBINATORIAL PROOF OF GOLDBACH'S CONJECTURE | Sarkis Khachatryan |
| 616 | NA | 2026 | 0 | A SIEVE-COMBINATORIAL PROOF OF GOLDBACH'S CONJECTURE | Sarkis Khachatryan |
| 617 | NA | 2026 | 0 | A SIEVE-COMBINATORIAL PROOF OF GOLDBACH'S CONJECTURE | Sarkis Khachatryan |
| 618 | NA | 2026 | 0 | Goldbach's Conjecture is true. Updated March 2026 | Janusz Czelakowski |
| 619 | NA | 2026 | 0 | Carry Signatures in a Binary Blockwise Reformulation of Goldbach's Conjecture | Ricardo Adonis Caraccioli Abrego |
| 620 | NA | 2026 | 0 | Goldbach's Conjecture: Solved via the Difference Checking Algorithm | Turishchev, Alexander |
| 621 | NA | 2026 | 0 | Exploration and thinking about the related problems of Goldbach's conjecture | CHEN chao |
| 622 | NA | 2026 | 0 | Goldbach's Conjecture as an Informational Coherence Phenomenon (Version 2) | Raoul Bianchetti |
| 623 | NA | 2026 | 0 | Goldbach's Conjecture as an Informational Coherence Phenomenon (Version 2) | Raoul Bianchetti |
| 624 | NA | 2026 | 0 | Report on the Theory of Semantic Consciousness Roots of Goldbach's Conjecture | Yucong Duan; Shuaishuai Huang; Shiming Gong |
| 625 | NA | 2026 | 0 | Goldbach's Conjecture: Solved via the Difference Checking Algorithm | Turishchev, Alexander |
| 626 | NA | 2026 | 0 | Exploration and thinking about the related problems of Goldbach's conjecture | CHEN chao |
| 627 | NA | 2026 | 0 | BS2 - Proving Goldbach's Conjecture Using Bertrand's Postulate | ROBERT L ROBBINS; Benard Omolo |
| 628 | NA | 2026 | 0 | Carry Signatures in a Binary Blockwise Reformulation of Goldbach's Conjecture | Ricardo Adonis Caraccioli Abrego |
| 629 | NA | 2026 | 0 | Goldbach's Conjecture as an Informational Coherence Phenomenon (Version 2) | Raoul Bianchetti |
| 630 | NA | 2026 | 0 | Goldbach's Conjecture: A Structural Foundation Proof via Mirror Symmetry | Nicolas Antony Brown |
| 631 | NA | 2026 | 0 | Goldbach's Conjecture: A Structural Foundation Proof via Mirror Symmetry | Nicolas Antony Brown |
| 632 | NA | 2026 | 0 | Complete Proof of Goldbach's Conjecture within the Unified Metabolic Causal Field | Jianbing zhu |
| 633 | NA | 2026 | 0 | Complete Proof of Goldbach's Conjecture within the Unified Metabolic Causal Field | Jianbing Zhu |
| 634 | NA | 2026 | 0 | Complete Proof of Goldbach's Conjecture within the Unified Metabolic Causal Field | Jianbing Zhu |
| 635 | NA | 2026 | 0 | Complete Proof of Goldbach's Conjecture within the Unified Metabolic Causal Field | Jianbing Zhu |
| 636 | NA | 2026 | 0 | A Pedagogical Framework for Exploring Goldbach's Conjecture via Modular Sieving and Primality Testing | Antonio Escultura |
| 637 | NA | 2026 | 0 | A Pedagogical Framework for Exploring Goldbach's Conjecture via Modular Sieving and Primality Testing | Antonio Escultura |
| 638 | NA | 2026 | 0 | The Proof of Goldbach's Conjecture and the Solution of k (k<5)-prime tuples Problem | Yuyang Zhu |
| 639 | NA | 2026 | 0 | The Unified Field of Heuristic Geometry: The Primes Sphere and the HPHE Resolution of Set Theory and Goldbach's Conjecture | Richard Cespedes |
| 640 | NA | 2026 | 0 | Goldbach's Conjecture in Sieve-Generated Arithmetic A Proof via Conservation of Algorithmic Work within LocalSieveAlg | Kajetan Młynarski |
| 641 | NA | 2026 | 0 | Goldbach's Conjecture: Essential Argument, Structural Judgment, and Branch Prediction Based on DIKWP Semantic Mathematics | Yucong Duan; Shuaishuai Huang; Shiming Gong |
| 642 | NA | 2026 | 0 | The Unified Field of Heuristic Geometry: The Primes Sphere and the HPHE Resolution of Set Theory and Goldbach's Conjecture | Richard Cespedes |
| 643 | NA | 2026 | 0 | A Unified Physical Approach to Millennium Prize Problems and Goldbach's Conjecture via Fpn-Dre Operational Calculus | Gen Aki |
| 644 | NA | 2026 | 0 | Goldbach's Conjecture as a Structural Necessity in Sieve-Generated Arithmetic Entropy Production and Relative Incompressibility in the Binary Sieve | Kajetan Młynarski |
| 645 | NA | 2026 | 0 | A Unified Physical Approach to Millennium Prize Problems and Goldbach's Conjecture via Fpn-Dre Operational Calculus | Gen Aki |
| 646 | NA | 2026 | 0 | The Kolcak Natural Law: A Unified Theory of Prime Numbers – Proof of Goldbach's Conjecture, the Riemann Hypothesis and P vs NP | Ahmet (Kolçakoglu) Akkol |
| 647 | NA | 2026 | 0 | The Kolcak Natural Law: A Unified Theory of Prime Numbers – Proof of Goldbach's Conjecture, the Riemann Hypothesis and P vs NP | Ahmet (Kolçakoglu) Akkol |
| 648 | NA | 2026 | 0 | A Simple Proof for Goldbach’s Conjecture | Pedro Alejandro Chou Rodríguez |
| 649 | NA | 2026 | 0 | An Arithmetic Operator on the Logarithmic Prime Lattice: GUE Statistics, a Robust Positive Spectral Gap, and a Spectral Circle Method for Goldbach's Conjecture | Oleg Glushkov |
| 650 | NA | 2026 | 0 | An Arithmetic Operator on the Logarithmic Prime Lattice: GUE Statistics, a Robust Positive Spectral Gap, and a Spectral Circle Method for Goldbach's Conjecture | Oleg Glushkov |
| 651 | NA | 2026 | 0 | Existence of Goldbach Partitions for Large Even Numbers under the 1/6 N Strong Constraint and a Rigorous Proof of the Order of Magnitude of the Goldbach Counting Function | ZhengRong Yin |
| 652 | NA | 2026 | 0 | Phenomenological Evidence of GUE Statistics and Thermodynamic Stability in Goldbach Partitions | Hazwani Azmi |
| 653 | NA | 2026 | 0 | Phenomenological Evidence of GUE Statistics and Thermodynamic Stability in Goldbach Partitions | Hazwani Azmi |
| 654 | NA | 2026 | 0 | A Langland Bridge between Analysis and Number Theory | Jacqueline Wötzel |
| 655 | NA | 2026 | 0 | Existence of Goldbach Partitions for Large Even Numbers under the 1/6 N Strong Constraint and a Rigorous Proof of the Order of Magnitude of the Goldbach Counting Function | ZhengRong Yin |
| 656 | NA | 2026 | 0 | On the Limit Problem of Mathematical Conjectures and the Unattainability of Unity: A Dynamical Systems Perspective | Meng Xie |
| 657 | NA | 2026 | 0 | On the Limit Problem of Mathematical Conjectures and the Unattainability of Unity: A Dynamical Systems Perspective | Meng Xie |
| 658 | NA | 2026 | 0 | On Prime Pairs | Zachary Wickstrom |
| 659 | NA | 2026 | 0 | On Prime Pairs | Zachary Wickstrom |
| 660 | NA | 2026 | 0 | Reductions to Prime Curvature Geometry: Conditional Theorems for Goldbach, Hardy–Littlewood A, and Short–Interval Problems | Bill Riemers |
| 661 | NA | 2026 | 0 | Reductions to Prime Curvature Geometry: Conditional Theorems for Goldbach, Hardy–Littlewood A, and Short–Interval Problems | Bill Riemers |
| 662 | NA | 2026 | 0 | Landau's Problems: A Unified Investigation Through Temporal Dynamics and Mathematical Decoherence Theory | James Norman Ibbotson |
| 663 | NA | 2026 | 0 | Reductions to Prime Curvature Geometry: Conditional Theorems for Goldbach, Hardy–Littlewood A, and Short–Interval Problems | Bill Riemers |
| 664 | NA | 2026 | 0 | A Proof of the Riemann Hypothesis via the Golden Ratio Numeral System | Lin Hao |
| 665 | NA | 2026 | 0 | "The Prime Highway: Resolution of Goldbach, Twin Prime, and Riemann Conjectures" | Robert James Murray-Lyon |
| 666 | NA | 2026 | 0 | A Proof of the Riemann Hypothesis via the Golden Ratio Numeral System | Lin Hao |
| 667 | NA | 2026 | 0 | A Proof of the Riemann Hypothesis via the Golden Ratio Numeral System | Lin Hao |
| 668 | NA | 2026 | 0 | Landau's Problems: A Unified Investigation Through Temporal Dynamics and Mathematical Decoherence Theory | James Norman Ibbotson |
| 669 | NA | 2026 | 0 | "The Prime Highway: Resolution of Goldbach, Twin Prime, and Riemann Conjectures" | Robert James Murray-Lyon |
| 670 | NA | 2026 | 0 | BCT Letter 175: Six Millennium Problems from OHC Void Geometry | Michel Robert Cabrié |
| 671 | NA | 2026 | 0 | Conjectura de Goldbach: Proposta de Uma Abordagem Geométrica com Buracos e Sombras em Números Ìmpares | Rodolfo Moroz |
| 672 | NA | 2026 | 0 | THE KOLCAK NATURAL LAW | Ahmet Akkol (Kolçakoglu) |
| 673 | NA | 2026 | 0 | Canonical Operator-Theoretic Framework | Uchechukwu Ihentuge |
| 674 | NA | 2026 | 0 | Canonical Operator-Theoretic Framework | Uchechukwu Ihentuge |
| 675 | NA | 2026 | 0 | BCT Letter 175: Six Millennium Problems from OHC Void Geometry | Michel Robert Cabrié |
| 676 | NA | 2026 | 0 | THE KOLCAK NATURAL LAW | Ahmet Akkol (Kolçakoglu) |
| 677 | NA | 2026 | 0 | "The Prime Highway: Resolution of Goldbach, Twin Prime, and Riemann Conjectures" | Robert James Murray-Lyon |
| 678 | NA | 2026 | 0 | The MBM Coprime Composite Sum Conjecture | Mohammad Mahmood |
| 679 | NA | 2026 | 0 | The MBM Coprime Composite Sum Conjecture | Mohammad Mahmood |
| 680 | NA | 2026 | 0 | The Canonical Obstruction to Binary Goldbach | Jonathan Washburn |
| 681 | NA | 2026 | 0 | "The Prime Highway: Resolution of Ten Major Conjectures in Number Theory" | Robert James Murray-Lyon |
| 682 | NA | 2026 | 0 | "The Prime Highway: Resolution of the Riemann Hypothesis and Five Prime Conjectures" | Robert James Murray-Lyon |
| 683 | NA | 2026 | 0 | The Second Main Term in the Asymptotic Formula for Goldbach Representations: Dirichlet Character Corrections and Their Arithmetic Origin | Ruqing Chen |
| 684 | NA | 2026 | 0 | <b>A Sieve Method for Generating 1+1 Prime Pairs and Goldbach Function</b> | Geeng-Chuan Chern |
| 685 | NA | 2026 | 0 | The Unified Solution to Millennium Prize Problems and the General Unified Field Theory | Efim Markov |
| 686 | NA | 2026 | 0 | The Unified Solution to Millennium Prize Problems and the General Unified Field Theory | Efim Markov |
| 687 | NA | 2026 | 0 | The Second Main Term in the Asymptotic Formula for Goldbach Representations: Dirichlet Character Corrections and Their Arithmetic Origin | Ruqing Chen |
| 688 | NA | 2026 | 0 | <b>A Sieve Method for Generating 1+1 Prime Pairs and Goldbach Function</b> | Geeng-Chuan Chern |
| 689 | NA | 2026 | 0 | "The Prime Highway: Resolution of Riemann, Goldbach, and Five Other Major Conjectures" | Robert James Murray-Lyon |
| 690 | NA | 2026 | 0 | "The Prime Highway: Resolution of Thirteen Major Conjectures in Number Theory" | Robert James Murray-Lyon |
| 691 | NA | 2026 | 0 | The Prime Highway: Resolution of Thirteen Major Conjectures in Number Theory | Robert James Murray-Lyon |
| 692 | NA | 2026 | 0 | Algebraic Analysis of Mersenne Primes and Even Perfect Numbers under the Modulo-6 Framework: Nested Safe-Residue-Class Structure and Unified Law模六框架下梅森素数与偶完全数的代数分析 嵌套安全剩余类结构与统一规律 | Xⅰngmⅰng Lⅰu |
| 693 | NA | 2026 | 0 | Algebraic Analysis of Mersenne Primes and Even Perfect Numbers under the Modulo-6 Framework: Nested Safe-Residue-Class Structure and Unified Law模六框架下梅森素数与偶完全数的代数分析 嵌套安全剩余类结构与统一规律 | Xⅰngmⅰng Lⅰu |
| 694 | NA | 2026 | 0 | φ Is the Eigenvalue of Self-Reference | Eric McLean |
| 695 | NA | 2026 | 0 | Deriving Golden Geometry as the Unique Stable Attractor of Quantum Self-Measurement | Eric McLean |
| 696 | NA | 2026 | 0 | φ Is the Eigenvalue of Self-Reference | Eric McLean |
| 697 | NA | 2026 | 0 | A Shape Decomposition for a Divisor–Goldbach Recursion and Closed Forms for Shape Coefficients | Abdeslam Aabidi El Moussati |
| 698 | NA | 2026 | 0 | Diversity, equity, and inclusion for problems in additive number theory | Melvyn B. Nathanson |
| 699 | NA | 2026 | 0 | Mathematicians in the age of AI | Jeremy Avigad |
| 700 | NA | 2026 | 0 | Coherence as the Possibility of Joint Success?: The Way to Success | Wooram Lee |
| 701 | NA | 2026 | 0 | A Chancy Theory of Metaphysical Indeterminacy | Alessandro Torza |
| 702 | NA | 2026 | 0 | On the link between the structure of A-branes observed in the homological mirror symmetry and the classical theory of automorphic forms: mathematical connections with the modular elliptic curves, p-adic and adelic numbers and p-adic and adelic strings | Michele Nardelli |
| 703 | NA | 2025 | 2 | Eigenphysics: The Emergence of Quantization from Entropy Geometry | David Sigtermans |
| 704 | NA | 2025 | 2 | Philosophical and mathematical reflection on Riemann's hypothesis. II The ontomathematical proof of Riemann's hypothesis in Hilbert arithmetic | Васил Пенчев |
| 705 | NA | 2025 | 2 | Primes are KS fundamentally random (but in Hilbert arithmetic, not in the standard mathematics) | Васил Пенчев |
| 706 | NA | 2025 | 1 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 707 | NA | 2025 | 1 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 708 | NA | 2025 | 1 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 709 | NA | 2025 | 1 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 710 | NA | 2025 | 1 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 711 | NA | 2025 | 1 | Formal inductive proof framework for the Binary Goldbach Conjecture based on prime interval stability | Samuel Buya Bonaya |
| 712 | NA | 2025 | 1 | Eigenphysics: The Emergence of Quantization from Entropy Geometry | David Sigtermans |
| 713 | NA | 2025 | 1 | A Quantum-Fractal-Logical Unified Field Proposal: Expanding the Riemann Hypothesis through a Logic-Resonant Network | Enrique Vidal Silvente |
| 714 | NA | 2025 | 1 | Goldbach's Conjecture Proof of its Interaction with the Riemann Hypothesis and the Golden Spiral via Inner Number Digit Summation (INDS) | Seyed Kazem Mousavi |
| 715 | NA | 2025 | 1 | Analytic Resolution of Goldbach’s Strong Conjecture Through the Circle Symmetry and the λ–Overlap Law | Bahbouhi Bouchaib |
| 716 | NA | 2025 | 1 | The Black and White Rabbits Model: A Dynamic Symmetry Framework for the Resolution of Goldbach’s Conjecture | Bouchaib Bahbouhi |
| 717 | NA | 2025 | 1 | The λ-Constant of Prime Curvature and Symmetric Density: Toward the Analytic Proof of Goldbach’s Strong Conjecture | Bouchaib Bahbouhi |
| 718 | NA | 2025 | 1 | A Discrepancy Measure Based on Expected Posterior Probability | Eric‐Jan Wagenmakers; Raoul P. P. P. Grasman |
| 719 | NA | 2025 | 1 | Geometric Basis of Entanglement in Six-Dimensional Space-Time | Seyed Kazem Mousavi; Elham Razzazi |
| 720 | NA | 2025 | 1 | Rank stability in quadratic extensions and Hilbert's tenth problem for the ring of integers of a number field | Levent Alpöge; Manjul Bhargava; Wei Ho; Ari Shnidman |
| 721 | NA | 2025 | 1 | On Chen's theorem, Goldbach's conjecture and almost prime twins III | Runbo Li |
| 722 | NA | 2025 | 0 | On the Strong Goldbach Conjecture | Mihoubi, Douadi |
| 723 | NA | 2025 | 0 | On the Strong Goldbach Conjecture | Mihoubi, Douadi |
| 724 | NA | 2025 | 0 | A Path to the Proof of the Goldbach Conjecture | JinRong Wang |
| 725 | NA | 2025 | 0 | A Proof of the Goldbach Conjecture | JinRong Wang |
| 726 | NA | 2025 | 0 | Goldbach Conjecture Strong 2nd Way | Taha Muhammad |
| 727 | NA | 2025 | 0 | Goldbach Conjecture (Strong) 1st Way | Taha Muhammad |
| 728 | NA | 2025 | 0 | Applications of the Binary Goldbach Conjecture to Prime Gaps | Samuel Buya Bonaya |
| 729 | NA | 2025 | 0 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 730 | NA | 2025 | 0 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 731 | NA | 2025 | 0 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 732 | NA | 2025 | 0 | Proof of the Binary Goldbach Conjecture | Philippe Sainty |
| 733 | NA | 2025 | 0 | The i = c Identity and the Structural Necessity of the Goldbach Conjecture | WAN AHMAD, WAN AZHAR |
| 734 | NA | 2025 | 0 | The i = c Identity and the Structural Necessity of the Goldbach Conjecture | WAN AHMAD, WAN AZHAR |
| 735 | NA | 2025 | 0 | The Strong Goldbach Conjecture via the Imbalance Prime Sieve | Paul Bilokon |
| 736 | NA | 2025 | 0 | Geometric Insights into the Goldbach Conjecture | Frank Vega |
| 737 | NA | 2025 | 0 | Geometric Insights into the Goldbach Conjecture | Frank Vega |
| 738 | NA | 2025 | 0 | A Short Elementary Proof of the Goldbach Conjecture | Yoshiki Ueoka |
| 739 | NA | 2025 | 0 | A Short Elementary Proof of the Goldbach Conjecture | Yoshiki Ueoka |
| 740 | NA | 2025 | 0 | Geometric Insights into the Goldbach Conjecture | Frank Vega |
| 741 | NA | 2025 | 0 | STRUCTURAL VERIFICATION OF THE GOLDBACH CONJECTURE: MODULAR CONSTRAINTS AND THE PRIME DIFFERENCE IDENTITY | Kabakçı, Mehmet Akif |
| 742 | NA | 2025 | 0 | A HEURİSTİC ANALYSİS OF THE GOLDBACH CONJECTURE: CENTRAL SYMMETRY AND THE DİVİSOR EFFECT | Kabakçı, Mehmet Akif |
| 743 | NA | 2025 | 0 | A Middle-Number Approach to Exploring the Goldbach Conjecture | Antonio Escultura |
| 744 | NA | 2025 | 0 | Proof of the Binary Goldbach Conjecture Using Maximal Prime Gaps | Samuel Buya Bonaya |
| 745 | NA | 2025 | 0 | A Middle-Number Approach to Exploring the Goldbach Conjecture | Antonio Escultura |
| 746 | NA | 2025 | 0 | <p>An Abstract Framework Validating Goldbach Conjecture</p> | Swadhin Banerjee |
| 747 | NA | 2025 | 0 | STRUCTURAL VERIFICATION OF THE GOLDBACH CONJECTURE: MODULAR CONSTRAINTS AND THE PRIME DIFFERENCE IDENTITY | Kabakçı, Mehmet Akif |
| 748 | NA | 2025 | 0 | The Goldbach Conjecture Proven Using Exponential Phase Contradiction | Jau Tang; Chien-Cheng Chang |
| 749 | NA | 2025 | 0 | Relationship Between Even and Prime Numbers and Implications on the Goldbach Conjecture | Samuel Buya Bonaya |
| 750 | NA | 2025 | 0 | Exploring the Goldbach Conjecture Through Number Theory and the Pigeonhole Principle | NGHIEM, BAO THINH |
| 751 | NA | 2025 | 0 | Algebraic Fractal Structure, the Principle of Least Effort, and the Strong Goldbach Conjecture | Ricardo Adonis Caraccioli Abrego |
| 752 | NA | 2025 | 0 | Ancient Arithmetic Prime Field Extension Theory: A Minimal Proof of the Strong Goldbach Conjecture | Lin, Jianfei |
| 753 | NA | 2025 | 0 | Ancient Arithmetic Prime Field Extension Theory: A Minimal Proof of the Strong Goldbach Conjecture | Lin, Jianfei |
| 754 | NA | 2025 | 0 | The Goldbach Conjecture Proven Using Exponential Phase Contradiction | Jau Hoong Tang; Chien-Cheng Chang |
| 755 | NA | 2025 | 0 | STRUCTURAL VERIFICATION OF THE GOLDBACH CONJECTURE: MODULAR CONSTRAINTS, THE PRIME DIFFERENCE IDENTITY, AND THE CONFINEMENT PRINCIPLE | Kabakçı, Mehmet Akif |
| 756 | NA | 2025 | 0 | A Structural Proof of the Goldbach Conjecture via Factor Elimination and Prime Complement Analysis | Younghwan Yun |
| 757 | NA | 2025 | 0 | A Structural Proof of the Goldbach Conjecture via Factor Elimination and Prime Complement Analysis | Younghwan Yun |
| 758 | NA | 2025 | 0 | A HEURİSTİC ANALYSİS OF THE GOLDBACH CONJECTURE: THE DİVİSOR EFFECT AND THE INTERQUARTİLE COMPRESSİON PRİNCİPLE | Kabakçı, Mehmet Akif |
| 759 | NA | 2025 | 0 | The Necessary and Sufficient Goldbach Spectrum: A Structurally Compelled Proof of the Goldbach Conjecture | Paltoo, Nigel |
| 760 | NA | 2025 | 0 | The Necessary and Sufficient Goldbach Spectrum: A Structurally Compelled Proof of the Goldbach Conjecture | Paltoo, Nigel |
| 761 | NA | 2025 | 0 | A Complete Spectral-Lattice Resolution of the Goldbach Conjecture via the ˆHSRF Structural Compulsion | Paltoo, Nigel.S. |
| 762 | NA | 2025 | 0 | A HEURİSTİC ANALYSİS OF THE GOLDBACH CONJECTURE: THE DİVİSOR EFFECT AND THE INTERQUARTİLE COMPRESSİON PRİNCİPLE | Kabakçı, Mehmet Akif |
| 763 | NA | 2025 | 0 | New Identities Arising from the Circle Method with Applications to the Goldbach Conjecture | Yue October, Bill, Q |
| 764 | NA | 2025 | 0 | A Complete Spectral-Lattice Resolution of the Goldbach Conjecture via the ˆHSRF Structural Compulsion | Paltoo, Nigel.S. |
| 765 | NA | 2025 | 0 | A Complete Spectral-Lattice Resolution of the Goldbach Conjecture via the ˆHSRF Structural Compulsion | Paltoo, Nigel.S. |
| 766 | NA | 2025 | 0 | Proof of RH and Goldbach Conjecture \& The Prime Wave Function https://zenodo.org/10.5281/zenodo.17746980 | wuzhongnwei |
| 767 | NA | 2025 | 0 | Proof of RH and Goldbach Conjecture \& The Prime Wave Function https://zenodo.org/10.5281/zenodo.17746980 | wuzhongnwei |
| 768 | NA | 2025 | 0 | A Complete Spectral-Lattice Resolution of the Goldbach Conjecture via Riemann-Hypothesis Inspired Hamiltonians | Paltoo, Nigel |
| 769 | NA | 2025 | 0 | An Explicit Either Or Proof of the Binary Goldbach Conjecture | DURAND, SERGE |
| 770 | NA | 2025 | 0 | A NEW APPROACH TO THE GOLDBACH CONJECTURE: CENTRAL SYMMETRY MODEL, NUMERICAL DNA AND DETERMINISTIC MODULAR FILTERING | Mehmet Akif Kabakçı |
| 771 | NA | 2025 | 0 | A Complete Spectral-Lattice Resolution of the Goldbach Conjecture via Riemann-Hypothesis Inspired Hamiltonians | Paltoo, Nigel |
| 772 | NA | 2025 | 0 | A Structural Proof of the Goldbach Conjecture via Factor Elimination and Prime Complement Analysis | Younghwan Yun |
| 773 | NA | 2025 | 0 | An Explicit Either Or Proof of the Binary Goldbach Conjecture | DURAND, SERGE |
| 774 | NA | 2025 | 0 | An Explicit Either Or Proof of the Binary Goldbach Conjecture | DURAND, SERGE |
| 775 | NA | 2025 | 0 | NEW APPROACH TO THE GOLDBACH CONJECTURE: CENTRAL SYMMETRY MODEL AND DETERMINISTIC MODULAR FILTERING | Kabakçı, Mehmet Akif |
| 776 | NA | 2025 | 0 | Proof of the Goldbach Conjecture: Structural Stability and Symmetric Sets https://zenodo.org/10.5281/zenodo.17742587 | wuzhongnwei |
| 777 | NA | 2025 | 0 | An Algebraic relationship between primes and How it can be used to prove Goldbach conjecture through a partition approach without parity obstruction | Samuel Buya Bonaya |
| 778 | NA | 2025 | 0 | A Complete Spectral-Lattice Resolution of the Goldbach Conjecture via Riemann-Hypothesis Inspired Hamiltonians | Paltoo, Nigel |
| 779 | NA | 2025 | 0 | A Heuristic Approach to the Strong Goldbach Conjecture Based on a Minimum Additive Prime Product Principle | Ricardo Adonis Caraccioli Abrego |
| 780 | NA | 2025 | 0 | Structural Resolution of the Goldbach Conjecture: Deterministic Saturation of the Symmetry Lattice via ADEC-SE-CS | Gianluca Remigio Pisano |
| 781 | NA | 2025 | 0 | Proof of the Goldbach Conjecture: Structural Stability and Symmetric Sets https://zenodo.org/10.5281/zenodo.17742587 | wuzhongnwei |
| 782 | NA | 2025 | 0 | Structural Resolution of the Goldbach Conjecture: Deterministic Saturation of the Symmetry Lattice via ADEC-SE-CS | Gianluca Remigio Pisano |
| 783 | NA | 2025 | 0 | A Complete Spectral-Lattice Resolution of the Goldbach Conjecture via Riemann-Hypothesis Inspired Hamiltonians | Paltoo, Nigel |
| 784 | NA | 2025 | 0 | Proof of the Strong Goldbach Conjecture via Luoshu Trace Conservation in Yijing–Jiuzhang Number Theory | 林, 剑飞 |
| 785 | NA | 2025 | 0 | A Structural and Deterministic Framework Suggesting the Strong Goldbach Conjecture via the Integrated MSHD–HSTG Model | Matsuura, Yoshihito |
| 786 | NA | 2025 | 0 | A Structural and Deterministic Framework Suggesting the Strong Goldbach Conjecture via the Integrated MSHD–HSTG Model | Matsuura, Yoshihito |
| 787 | NA | 2025 | 0 | Proof of goldbach conjecture | Martin Somogyi |
| 788 | NA | 2025 | 0 | Proof of the Strong Goldbach Conjecture via Luoshu Trace Conservation in Yijing–Jiuzhang Number Theory | 林, 剑飞 |
| 789 | NA | 2025 | 0 | Conservative Motion Theory – D II: Fredholm–Analytic Resolution of the Goldbach Conjecture | Kawasaki, Hideyo |
| 790 | NA | 2025 | 0 | Conservative Motion Theory – D II: Fredholm–Analytic Resolution of the Goldbach Conjecture | Kawasaki, Hideyo |
| 791 | NA | 2025 | 0 | Harmonic relationship between Arithmetic and Geometric mean. An inductive mechanism for the proof of the Binary Goldbach conjecture | Samuel Buya Bonaya |
| 792 | NA | 2025 | 0 | A Fully Structural and Deterministic Proof of the Strong Goldbach Conjecture via the MSHD–HSTG Dual Framework (Version3) | Matsuura, Yoshihito |
| 793 | NA | 2025 | 0 | A Dynamical Route to the Goldbach Conjecture | Dawoo Maheshwari |
| 794 | NA | 2025 | 0 | A Dynamical Route to the Goldbach Conjecture | Dawoo Maheshwari |
| 795 | NA | 2025 | 0 | The Spectral Dual Resolution of the Collatz and Goldbach Conjectures via E8 →G24 Anti-Collision and Base-24 Harmonic Resonance | Brendan Lynch |
| 796 | NA | 2025 | 0 | The Spectral Dual Resolution of the Collatz and Goldbach Conjectures via E8 →G24 Anti-Collision and Base-24 Harmonic Resonance | Brendan Lynch |
| 797 | NA | 2025 | 0 | A Sieve-Theoretic Reformulation of the Goldbach Conjecture | Riemers, Bill |
| 798 | NA | 2025 | 0 | Goldbach Conjecture from the Generative Kernel: Every Even Integer Greater Than 2 Is the Sum of Two Threshold Solitons | Svancara, Clinton |
| 799 | NA | 2025 | 0 | Structural Resolution of the Goldbach Conjecture: ADEC-SE-CS Framework, MANPG Operator, and Asymptotic Validation | Gianluca Remigio Pisano |
| 800 | NA | 2025 | 0 | Goldbach Conjecture from the Generative Kernel: Every Even Integer Greater Than 2 Is the Sum of Two Threshold Solitons | Svancara, Clinton |
| 801 | NA | 2025 | 0 | Global Arithmetic Constraints on Local Supersymmetric Systems: L-Function Decomposition and the Spectral Realization of the Restricted Goldbach Conjecture | Kokuno, Yumeto; Miroku, Akagi; Maya, Sakuyah; Kaisō, Shinjun |
| 802 | NA | 2025 | 0 | The Twin Prime and Goldbach Conjectures: A Quantitative Link | Beleza, Michel Eduardo |
| 803 | NA | 2025 | 0 | GOLDBACH CONJECTURE AND ARITHMETIC-LOGARITHMIC MEAN INEQUALITY | Pengcheng Niu; Junli Zhang |
| 804 | NA | 2025 | 0 | Differential Algebraic Methods in Additive Number Theory: A Constructive Framework for Partition Functions, Additive Bases, and a Complete Proof of the Goldbach Conjecture | shifa liu |
| 805 | NA | 2025 | 0 | Differential Algebraic Methods in Additive Number Theory: A Constructive Framework for Partition Functions, Additive Bases, and a Complete Proof of the Goldbach Conjecture | shifa liu |
| 806 | NA | 2025 | 0 | Achieving quantum advantage in a search for a violations of the Goldbach conjecture, with driven atoms in tailored potentials | Oleksandr V. Marchukov; Andrea Trombettoni; Giuseppe Mussardo; Maxim Olshanii |
| 807 | NA | 2025 | 0 | Verifiability of Dual-Subject Intelligence Theory: Breakthrough Cases in the Goldbach Conjecture and Complex Social System Modeling | Luo, Shisu; Su, mì |
| 808 | NA | 2025 | 0 | A Domain-Theoretic Approach to Number Theory via the Continuous Domain of Prime Pairs with Applications to the Goldbach Conjecture and Large Integer Factorization | Paul Bilokon |
| 809 | NA | 2025 | 0 | The Prime Count-Sum Theorem and Its Applications to the Goldbach Conjecture | Samuel Buya Bonaya |
| 810 | NA | 2025 | 0 | "From the Goldbach Conjecture to the Riemann Conjecture and the Concept of Ideal Prime Numbers" | Tran, Van Tuan |
| 811 | NA | 2025 | 0 | The mean and sum of primes in a given interval and their applications in the proof of the Goldbach conjecture | Samuel Buya Bonaya |
| 812 | NA | 2025 | 0 | "From the Goldbach Conjecture to the Riemann Conjecture and the Concept of Ideal Prime Numbers" | Tran, Van Tuan |
| 813 | NA | 2025 | 0 | Deterministic Goldbach Conjecture via the Standing/Sitting Band Framework and RH Hamiltonian | Nigel Stafford Paltoo; Eliyahu Fir-Sean Paltoo; Bindrawattie Singh-Paltoo |
| 814 | NA | 2025 | 0 | Deterministic Goldbach Conjecture via the Standing/Sitting Band Framework and RH Hamiltonian | Nigel Stafford Paltoo; Eliyahu Fir-Sean Paltoo; Bindrawattie Singh-Paltoo |
| 815 | NA | 2025 | 0 | Deterministic Goldbach Conjecture via the Standing/Sitting Band Framework and RH Hamiltonian | Nigel Stafford Paltoo; Eliyahu Fir-Sean Paltoo; Bindrawattie Singh-Paltoo |
| 816 | NA | 2025 | 0 | Deterministic Goldbach Conjecture via the Standing/Sitting Band Framework and RH Hamiltonian | Nigel Stafford Paltoo; Eliyahu Fir-Sean Paltoo; Bindrawattie Singh-Paltoo |
| 817 | NA | 2025 | 0 | On the Non-Abelian Spectral Resolution of the Binary Goldbach Conjecture via Transfinite Sieve Homology | Zen Revista; 10 MFC |
| 818 | NA | 2025 | 0 | The Binary Goldbach Conjecture and its Relatives under a Bivariate Bilinear Minor Arc Hypothesis | Erhard, Jakob |
| 819 | NA | 2025 | 0 | On the Non-Abelian Spectral Resolution of the Binary Goldbach Conjecture via Transfinite Sieve Homology | Zen Revista; 10 MFC |
| 820 | NA | 2025 | 0 | Structural Resolution of the Goldbach Conjecture: ADEC-SE-CS Framework, MANPG Operator, and Asymptotic Validation | Gianluca Remigio Pisano |
| 821 | NA | 2025 | 0 | Applications of the Binary Goldbach Conjecture to Prime Gaps. A Comprehensive Inductive Proof via Bertrand Intervals | Samuel Bonaya Buya |
| 822 | NA | 2025 | 0 | Structural Resolution of the Goldbach Conjecture: ADEC-SE-CS Framework, MANPG Operator, and Asymptotic Validation | Gianluca Remigio Pisano |
| 823 | NA | 2025 | 0 | Binary Goldbach Conjecture: A Multi-Domain Resolution utilizing Analytic Thresholds, Finite Verification, and Anderson Operator Sealing via (ARK) Agnostic Replication Kit | Forrest Forrest M. Anderson |
| 824 | NA | 2025 | 0 | Goldbach’s Conjecture | Mariana Vazquez Coello |
| 825 | NA | 2025 | 0 | Goldbach Failures Induce Topological Gaps in the Space of Prime Imbalances | Paul Bilokon |
| 826 | NA | 2025 | 0 | 哥德巴赫猜想的几何证明:基于质数-测地线对应的动力系统方法 A Geometric Proof of the Goldbach Conjecture: A Dynamical Systems Approach via Prime-Geodesic Correspondence | ziko |
| 827 | NA | 2025 | 0 | 哥德巴赫猜想的几何证明:基于质数-测地线对应的动力系统方法 A Geometric Proof of the Goldbach Conjecture: A Dynamical Systems Approach via Prime-Geodesic Correspondence | ziko |
| 828 | NA | 2025 | 0 | Research on the Evolution of Type Definitions and Semantic Proof Paths in Yucong Duan's DIKWP Semantic Space - Taking Goldbach Conjecture and Collatz Conjecture as Examples | Yucong Duan; Shuaishuai Huang; Shiming Gong |
| 829 | NA | 2025 | 0 | Binary Goldbach Conjecture: A Multi-Domain Resolution utilizing Analytic Thresholds, Finite Verification, and Anderson Operator Sealing via (ARK) Agnostic Replication Kit | Forrest Forrest M. Anderson |
| 830 | NA | 2025 | 0 | WITHDRAWN | tshijie; 唐子周 |
| 831 | NA | 2025 | 0 | An Approach Using Combinatorics for the Decomposition of Odd Pairs in Relation to Goldbach's Conjecture | NGHIEM, BAO THINH |
| 832 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 833 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 834 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 835 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 836 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 837 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 838 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 839 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 840 | NA | 2025 | 0 | Symmetry of Prime Numbers | Edranov Denis |
| 841 | NA | 2025 | 0 | The Symmetry Number Structure about Line-1/2 | Yajun Liu |
| 842 | NA | 2025 | 0 | The Symmetry Number Structure About Line-1/2 | Yajun Liu |
| 843 | NA | 2025 | 0 | Partitions of Natural Numbers and Complex Network Representations | Alexandre Benatti; Luciano da Fontoura Costa |
| 844 | NA | 2025 | 0 | The Symmetry Number Structure about Line-1/2 | Yajun Liu |
| 845 | NA | 2025 | 0 | 2025-08-10_RFT_Goldbach_Conjecture_via_Relational_Field_Theory_Formal_Proof_Framework_with_Synthetic_Cognition_and_Spectral_Analysis | Svancara, Clinton |
| 846 | NA | 2025 | 0 | Additive Bases and Schnirelmann Density: Quantifying Goldbach and Waring | Revista, Zen; MATH, 10 |
| 847 | NA | 2025 | 0 | Additive Bases and Schnirelmann Density: Quantifying Goldbach and Waring | Revista, Zen; MATH, 10 |
| 848 | NA | 2025 | 0 | A Proof of Goldbach's Strong Conjecture | Emily Condit |
| 849 | NA | 2025 | 0 | Symbolic Resolution of Goldbach’s Conjecture via the AION Framework | Abdeslam Aabidi El Moussati |
| 850 | NA | 2025 | 0 | Goldbach’s Conjecture as a Resolution Condition Under Entropy Geometry | David Sigtermans |
| 851 | NA | 2025 | 0 | Goldbach's Conjecture as a Resolution Condition under Entropy Geometry | David Sigtermans |
| 852 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 853 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 854 | NA | 2025 | 0 | When Goldbach Fails: A Geometric Consequence in Prime Imbalance Space | Paul Bilokon |
| 855 | NA | 2025 | 0 | Symmetric Zeros in the Imbalance Sequence via Möbius Obstructions | Paul Bilokon |
| 856 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 857 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 858 | NA | 2025 | 0 | <p><a rel="nofollow"></a><a rel="nofollow"><span>An Ingenious Proof of the Twin Prime and Goldbach Conjectures</span></a></p> | Qin Zhou; jiajun zhou |
| 859 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 860 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 861 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 862 | NA | 2025 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 863 | NA | 2025 | 0 | A Continuous, Topological View of Semiprime Factorization | Paul Bilokon |
| 864 | NA | 2025 | 0 | 2025-11-22_RFT_Goldbach_Conjecture_from_the_Generative_Kernel_Every_Even_Integer_Greater_Than_2_Is_the_Sum_of_Two_Threshold_Solitons | Svancara, Clinton |
| 865 | NA | 2025 | 0 | Empirical Verification of Goldbach’s Conjecture Beyond Four Quintillion | Parth Gosar; Soumyadeep Das; Sahil Pardasani |
| 866 | NA | 2025 | 0 | Structural Patterns of Goldbach Partition Numbers: A High-Precision Estimation Model Based on Prime Density | Zhao Shijian |
| 867 | NA | 2025 | 0 | The Nonzero Imbalance Uniquely Determines Nonequal Prime Pairs | Paul Bilokon |
| 868 | NA | 2025 | 0 | Time-Scalar Field Theory (TSFT): A Closed-Manifold, Two-Boundary Formulation That Unifies Quantum Mechanics, General Relativity, Consciousness, and the Distribution of Prime Numbers | Jordan Gabriel Farrell |
| 869 | NA | 2025 | 0 | Time-Scalar Field Theory (TSFT): A Closed-Manifold, Two-Boundary Formulation That Unifies Quantum Mechanics, General Relativity, Consciousness, and the Distribution of Prime Numbers | Jordan Gabriel Farrell |
| 870 | NA | 2025 | 0 | Quadratic Compensation and Single-Prime Convergence in Goldbach Pair Generation | Shang Yu Chen |
| 871 | NA | 2025 | 0 | A Quantum-Fractal-Logical Unified Field Proposal: Expanding the Riemann Hypothesis through a Logic-Resonant Network | Enrique Vidal Silvente |
| 872 | NA | 2025 | 0 | Density Bounds and Asymptotic Estimates in Additive Problems: Bridging Goldbach, Waring, and Schnirelmann | Revista, Zen; MATH, 10 |
| 873 | NA | 2025 | 0 | A constructive descent via the Bridge transformation (with a finite base verification) | Yoshiki Ueoka |
| 874 | NA | 2025 | 0 | Goldbach and the Triple Interface Method | Anonymous Quiller |
| 875 | NA | 2025 | 0 | Constructive Additive Theory of Natural Numbers | Młynarski, Kajetan |
| 876 | NA | 2025 | 0 | A Proof of Goldbach's Strong Conjecture and the Twin Prime Conjecture | Emily Condit |
| 877 | NA | 2025 | 0 | Constructive Additive Theory of Natural Numbers | Młynarski, Kajetan |
| 878 | NA | 2025 | 0 | A Proof of Goldbach's Strong Conjecture and the Twin Prime Conjecture | Emily Condit |
| 879 | NA | 2025 | 0 | A Proof of Goldbach's Strong Conjecture and the Twin Prime Conjecture | Emily Condit |
| 880 | NA | 2025 | 0 | Density Bounds and Asymptotic Estimates in Additive Problems: Bridging Goldbach, Waring, and Schnirelmann | Revista, Zen; MATH, 10 |
| 881 | NA | 2025 | 0 | ALGEBRAIC AND GEOMETRIC REPRESENTATION OF GOLDBACH PARTITIONS IN THE COMPLEX PLANE | Samuel Buya Bonaya |
| 882 | NA | 2025 | 0 | Goldbach via Two Thresholds and the Circle Method | Lambrecht, Stéphan |
| 883 | NA | 2025 | 0 | Goldbach via Two Thresholds and the Circle Method | Lambrecht, Stéphan |
| 884 | NA | 2025 | 0 | Prime Multiple Missing Graphs | Shamik Ghosh |
| 885 | NA | 2025 | 0 | An Exact Identity for the Twin Prime Counting Function Derived from Minimal Goldbach Partitions | Beleza Yamagishi, Michel Eduardo |
| 886 | NA | 2025 | 0 | An Exact Identity for the Twin Prime Counting Function Derived from Minimal Goldbach Partitions | Beleza Yamagishi, Michel Eduardo |
| 887 | NA | 2025 | 0 | Eigenphysics: The Emergence of Quantization from Entropy Geometry | David Sigtermans |
| 888 | NA | 2025 | 0 | Positive Characterizations of Odd and Prime Numbers via Additive Profiles | Młynarski, Kajetan |
| 889 | NA | 2025 | 0 | Eigenphysics: The Emergence of Quantization from Entropy Geometry | David Sigtermans |
| 890 | NA | 2025 | 0 | Time-Field Symmetry and the Goldbach Structure: A Chronos-Theoretic Interpretation of Prime Pairing | Hall, Matthew |
| 891 | NA | 2025 | 0 | Positive Characterizations of Odd and Prime Numbers via Additive Profiles | Młynarski, Kajetan |
| 892 | NA | 2025 | 0 | Time-Field Symmetry and the Goldbach Structure: A Chronos-Theoretic Interpretation of Prime Pairing | Hall, Matthew |
| 893 | NA | 2025 | 0 | Quantitative Schnirelmann Density for Waring-Goldbach Sums | Revista, Zen; MATH, 10 |
| 894 | NA | 2025 | 0 | Quantitative Schnirelmann Density for Waring-Goldbach Sums | Revista, Zen; MATH, 10 |
| 895 | NA | 2025 | 0 | The Yijing–Jiuzhang Number Theory: A Parameter-Free Final Unified Theory Encoded 2100 Years Ago | 林, 剑飞 |
| 896 | NA | 2025 | 0 | A Revisit of Some Popular Conjectures in Number Theory Through the Lens of the Conjecture Quest Method (CQM): A Pedagogical Perspective | Sabiruddin Molla; Saba Sultana |
| 897 | NA | 2025 | 0 | The Yijing–Jiuzhang Number Theory: A Parameter-Free Final Unified Theory Encoded 2100 Years Ago | 林, 剑飞 |
| 898 | NA | 2025 | 0 | The Yijing–Jiuzhang Number Theory: A Parameter-Free Final Unified Theory Encoded 2100 Years Ago | 林, 剑飞 |
| 899 | NA | 2025 | 0 | The Parity Gap: A Structural Heuristic for Goldbach's Binary Problem | Daniel Taraborelli |
| 900 | NA | 2025 | 0 | The Schnirelmann Signature of Additive Structures: Unifying Goldbach and Waring Problems | Revista, Zen; MATH, 10 |
| 901 | NA | 2025 | 0 | The Schnirelmann Signature of Additive Structures: Unifying Goldbach and Waring Problems | Revista, Zen; MATH, 10 |
| 902 | NA | 2025 | 0 | A Formal Proof for the Goldbach’s Strong Conjecture by the Unified Prime Equation and the Z Constant | Bouchaib Bahbouhi |
| 903 | NA | 2025 | 0 | New Identities Enabling the Circle Method for the Twin Prime Conjecture | Yue October, Bill, Q |
| 904 | NA | 2025 | 0 | The Goldbach Quasicrystal: Topological Protection and Scale-Invariance in Prime Partition Networks | Andrés Sebastián, Pirolo |
| 905 | NA | 2025 | 0 | Nouvelle conjecture: Application à la preuve des conjectures de Goldbach et des premiers jumeaux | Ahmed Friâa; M. Ammar |
| 906 | NA | 2025 | 0 | The Goldbach Quasicrystal: Topological Protection and Scale-Invariance in Prime Partition Networks | Andrés Sebastián, Pirolo |
| 907 | NA | 2025 | 0 | La conjecture YH (suite) : Preuve complète du théorème fondamental et nouvelles applications | Ahmed Friâa; Ammar, Mohamed, Naceur |
| 908 | NA | 2025 | 0 | The Parity Gap: A Structural Heuristic for Goldbach's Binary Problem | Daniel Taraborelli |
| 909 | NA | 2025 | 0 | Metaformalism and the Emergence of Classical Mathematics from Phase Structure | David Sepiashvili |
| 910 | NA | 2025 | 0 | Metaformalism and the Emergence of Classical Mathematics from Phase Structure | David Sepiashvili |
| 911 | NA | 2025 | 0 | The Prime Synchronization Theorem: An Empirical Scaling Law for Goldbach Partitions and Kuramoto Dynamics | Hristo Nedelchev |
| 912 | NA | 2025 | 0 | Goldbach Symmetry Network and Sierpinski Triangle | Pisano, Gianluca Remigio |
| 913 | NA | 2025 | 0 | Goldbach Symmetry Network and Sierpinski Triangle | Pisano, Gianluca Remigio |
| 914 | NA | 2025 | 0 | Elliptic Phase Geometry: Isomorphism of RH, BSD, and Quantum Fluctuations | Wang, Jifei |
| 915 | NA | 2025 | 0 | The Prime Synchronization Theorem: An Empirical Scaling Law for Goldbach Partitions and Kuramoto Dynamics | Hristo Nedelchev |
| 916 | NA | 2025 | 0 | Structural Constraints on Goldbach's Binary Problem: The Parity Gap and the Dead Zone | Daniel Taraborelli |
| 917 | NA | 2025 | 0 | Elliptic Phase Geometry: Isomorphism of RH, BSD, and Quantum Fluctuations | Wang, Jifei |
| 918 | NA | 2025 | 0 | Structural Constraints on Goldbach's Binary Problem: The Parity Gap and the Dead Zone | Daniel Taraborelli |
| 919 | NA | 2025 | 0 | Structural Deficits in Shifted Prime Complements: A Volume-Capacity Analysis | Daniel Taraborelli |
| 920 | NA | 2025 | 0 | Bilinear obstructions in the cancellation theory of multiplicative functions | Deligiannis, Theodoros |
| 921 | NA | 2025 | 0 | Structural Deficits in Shifted Prime Complements: A Volume-Capacity Analysis | Daniel Taraborelli |
| 922 | NA | 2025 | 0 | An Arithmetic Spectral Expansion Approach to Goldbach | DURAND, SERGE |
| 923 | NA | 2025 | 0 | An Arithmetic Spectral Expansion Approach to Goldbach | DURAND, SERGE |
| 924 | NA | 2025 | 0 | Goldbach Flow Program v3.4b Entropy–Spectral Closure, Predictive Goldbach Law, and Density–0 Rigidity | Byoungwoo Lee |
| 925 | NA | 2025 | 0 | Goldbach Flow Program v3.4b Entropy–Spectral Closure, Predictive Goldbach Law, and Density–0 Rigidity | Lee, Byoungwoo |
| 926 | NA | 2025 | 0 | Vô conjecture 22(VC22) | Vô, Pseudonym |
| 927 | NA | 2025 | 0 | The Prime Synchronization Theorem: An Empirical Scaling Law for Goldbach Partitions and Kuramoto Dynamics | Hristo Nedelchev |
| 928 | NA | 2025 | 0 | The Prime Emergence Theorem: A Rigorous Mathematical Law Connecting Prime Numbers to Synchronization Phenomena | Nedelchev, Hristo |
| 929 | NA | 2025 | 0 | The Prime Emergence Theorem: A Rigorous Mathematical Law Connecting Prime Numbers to Synchronization Phenomena | Nedelchev, Hristo |
| 930 | NA | 2025 | 0 | The PCWL Paradigm Shift in Prime Number Theory | DURAND, SERGE |
| 931 | NA | 2025 | 0 | The PCWL Paradigm Shift in Prime Number Theory | DURAND, SERGE |
| 932 | NA | 2025 | 0 | Empirical Verification of the Modular Law in Goldbach Partitions up to 300000 | DURAND, SERGE |
| 933 | NA | 2025 | 0 | The Prime Synchronization Theorem: An Empirical Scaling Law for Goldbach Partitions and Kuramoto Dynamics | Hristo Nedelchev |
| 934 | NA | 2025 | 0 | Empirical Verification of the Modular Law in Goldbach Partitions up to 300000 | DURAND, SERGE |
| 935 | NA | 2025 | 0 | Towards a Deterministic Equation for the Prime Numbers | DURAND, SERGE |
| 936 | NA | 2025 | 0 | The_Arithmetic_Clock_Trilogy | DURAND, SERGE |
| 937 | NA | 2025 | 0 | The_Arithmetic_Clock_Trilogy | DURAND, SERGE |
| 938 | NA | 2025 | 0 | The_Arithmetic_Clock_Trilogy | DURAND, SERGE |
| 939 | NA | 2025 | 0 | The_Arithmetic_Clock_Trilogy | DURAND, SERGE |
| 940 | NA | 2025 | 0 | Towards a Deterministic Equation for the Prime Numbers | DURAND, SERGE |
| 941 | NA | 2025 | 0 | The PCWL Paradigm Shift in Prime Number Theory | DURAND, SERGE |
| 942 | NA | 2025 | 0 | The PCWL Paradigm Shift in Prime Number Theory | DURAND, SERGE |
| 943 | NA | 2025 | 0 | Causal Unification of Goldbach via the Arithmetic Hamiltonian Hzeta | DURAND, SERGE |
| 944 | NA | 2025 | 0 | Causal Unification of Goldbach via the Arithmetic Hamiltonian Hzeta | DURAND, SERGE |
| 945 | NA | 2025 | 0 | Holographic Information Conservation in an Arithmetic Toy Model: A Mellin–Trace Framework | Lee, Byoungwoo |
| 946 | NA | 2025 | 0 | An Arithmetic Spectral Expansion Approach to Goldbach | DURAND, SERGE |
| 947 | NA | 2025 | 0 | An Arithmetic Spectral Expansion Approach to Goldbach | DURAND, SERGE |
| 948 | NA | 2025 | 0 | پاسخ به معماهای علم و فلسفه با معادله حمزه | JALALI, SEYED RASOUL |
| 949 | NA | 2025 | 0 | پاسخ به معماهای علم و فلسفه با معادله حمزه | JALALI, SEYED RASOUL |
| 950 | NA | 2025 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 951 | NA | 2025 | 0 | Strong Golbach's conjecture proof using a structural approach to numbers | Otman AGUEZOUL |
| 952 | NA | 2025 | 0 | Twin Primes Proven by Phase Symmetry and Spectral Parity | Jau Tang; Chang Chien-Cheng |
| 953 | NA | 2025 | 0 | A simple proof for Goldbach's conjecture | Pedro Alejandro Chou Rodríguez |
| 954 | NA | 2025 | 0 | A simple proof for Goldbach's conjecture | Pedro Alejandro Chou Rodríguez |
| 955 | NA | 2025 | 0 | Additive problems on $\lfloor p^c \rfloor$ | Lingyu Guo; Victor Zhenyu Guo; Lu Li |
| 956 | NA | 2025 | 0 | A simple proof for Goldbach's conjecture | Pedro Alejandro Chou Rodríguez |
| 957 | NA | 2025 | 0 | The Stability Axiom for the Prime Population: Centrality of Integers, Invariant Logarithmic Windows, and Additive Consequences | Bouchaib Bahbouhi |
| 958 | NA | 2025 | 0 | The Superiority of Hilbert Arithmetic for Prime Number Theory: I Goldbach's conjecture proved in Hilbert arithmetic | Васил Пенчев |
| 959 | NA | 2025 | 0 | The Goldbach Comet Revisited: Density, Obstruction, and the Ω–λ–Κ Framework for an Analytic Explanation of Goldbach’s Conjecture | Bouchaib Bahbouhi |
| 960 | NA | 2025 | 0 | Vinogradov's three primes theorem in the intersection of multiple Piatetski-Shapiro sets | Xiaotian Li; Jinjiang Li; Min Zhang |
| 961 | NA | 2025 | 0 | A Quantum-Fractal-Logical Unified Field Proposal: Expanding the Riemann Hypothesis through a Logic-Resonant Network | Enrique Vidal Silvente |
| 962 | NA | 2025 | 0 | 关于孪生素数猜想成立的推理 | Zizhou Tang; Shijie Tang; TangShijing Tang |
| 963 | NA | 2025 | 0 | Expressing Primes in Terms of Primes: Are Prime Numbers Modularly or Hierarchically Organized? | Alexandre Benatti; Luciano da Fontoura Costa |
| 964 | NA | 2025 | 0 | On Goldbach numbers in short intervals | Andrés Chirre; Markus Valås Hagen |
| 965 | NA | 2025 | 0 | An $L^2$-bound for the Barban-Vehov weights | Olivier Ramaré; Sebastian Zuniga Alterman |
| 966 | NA | 2025 | 0 | On the Partitioning Structure of Prime Numbers | Alexandre Benatti; Luciano da Fontoura Costa |
| 967 | NA | 2025 | 0 | Twin Primes Proven by Phase Symmetry and Spectral Parity | Jau Tang |
| 968 | NA | 2025 | 0 | The Goldbach Circle: A Unified Geometric and Analytic Law for Predicting Prime Paris | Bouchaib Bahbouhi |
| 969 | NA | 2025 | 0 | Moment conditions for the asymptotic completeness of iid gap sequences | Vahram Asatryan; Erik Babasyan; Sevak Mkrtchyan |
| 970 | NA | 2025 | 0 | A Near-Proof of Goldbach’s Conjecture via Symmetric Prime Structures<strong> </strong> | Bouchaib Bahbouhi |
| 971 | NA | 2025 | 0 | Fiberwise Gromov-Witten theory, quantum spectra of flag bundles, and prime factorization of integers | Giordano Cotti |
| 972 | NA | 2025 | 0 | Primes of the Form $m^2+1$ and Goldbach's `Other Other' Conjecture | Jon Grantham; Hester Graves |
| 973 | NA | 2025 | 0 | From explicit estimates for the primes to explicit estimates for the Möbius function - II | Olivier Ramaré; Sebastian Zuniga Alterman |
| 974 | NA | 2025 | 0 | Tripartite Symmetry and Prime Positioning: A New Framework Leading to the Proof of Goldbach’s Conjecture | Bouchaib Bahbouhi |
| 975 | NA | 2025 | 0 | The λ-Symmetry Principle: A Definitive Analytic Resolution of Goldbach’s Conjecture | Bouchaib Bahbouhi |
| 976 | NA | 2025 | 0 | 关于孪生素数猜想成立的推理 | Zizhou Tang; Shijie Tang; TangShijing Tang |
| 977 | NA | 2025 | 0 | A Symmetric Two-Ball Dynamical Framework for Goldbach’s Conjecture From Static Additivity to Deterministic Non-Avoidance | Bouchaib Bahbouhi |
| 978 | NA | 2025 | 0 | Quantum Space -Time with Energy and Unified Field Theory | Yajun Liu |
| 979 | NA | 2025 | 0 | Prime labelings on a 3xn grid graph | S. J. Curran; Matt Ollis |
| 980 | NA | 2025 | 0 | Differential Algebraic Methods in Analytic Number Theory: A Constructive Framework for Explicit Formulae and Prime Distribution | shifa liu |
| 981 | NA | 2025 | 0 | Logarithmic and Modular Compensation in Goldbach Structures | Shang Yu Chen |
| 982 | NA | 2025 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 983 | NA | 2025 | 0 | Log-free bounds on exponential sums over primes | Priyamvad Srivastav |
| 984 | NA | 2025 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 985 | NA | 2025 | 0 | Geometric Basis of Entanglement in Six-Dimensional Space-Time | Seyed Kazem Mousavi; Elham Razzazi |
| 986 | NA | 2025 | 0 | Dynamics and Application Through the Rule Based Transformation of Non-negative Integer Pairs | Sudhakar Sahoo; Arijit Ghosh; Jayanta Kumar Das; Pabitra Pal Choudhury |
| 987 | NA | 2025 | 0 | On the Realizability of Prime Conjectures in Heyting Arithmetic | Milan Rosko |
| 988 | NA | 2025 | 0 | Integrally Hilbertian rings and the polynomial Schinzel hypothesis | Angelot Behajaina; Pierre Dèbes; König, Joachim |
| 989 | NA | 2025 | 0 | Symmetry, Covariance, and the Demonstration of Goldbach’s Conjecture through the Unified Prime Equation and Overlapping Windows | Bouchaib Bahbouhi |
| 990 | NA | 2025 | 0 | Philosophical and Ontological Implications of the Quantum-Fractal Logical Unified Field Theory | Enrique Vidal Silvente |
| 991 | NA | 2025 | 0 | From One-Sided Prime Distribution to Two-Sided Symmetry: Reconstructing Goldbach’s Conjecture to Find a Complete Proof | Bouchaib Bahbouhi |
| 992 | NA | 2025 | 0 | Entropic Flow and Prime-Domain Computation: A Structural Study of the Collatz Dynamics | Shang Yu Chen |
| 993 | NA | 2025 | 0 | Nikolai Vavilov, mathematics and life | Eugene Plotkin |
| 994 | NA | 2025 | 0 | On the density version of quadratic Waring's problem and the quadratic Waring--Goldbach problem | Zi Li Lim |
| 995 | NA | 2025 | 0 | A Metaformal Decomposition of the Goldbach Problem: Core–Residual Structure, Operator Calibration, and Minor-Arc Control | David Sepiashvili |
| 996 | NA | 2025 | 0 | Exceptional Sets in Waring-Goldbach Problems: A Schnirelmann Density Perspective | Revista, Zen; MATH, 10 |
| 997 | NA | 2025 | 0 | A Metaformal Decomposition of the Goldbach Problem: Core–Residual Structure, Operator Calibration, and Minor-Arc Control | David Sepiashvili |
| 998 | NA | 2025 | 0 | OVERLAPPING CHEN–TYPE ALMOST-PRIME CONSTRAINTS IN THE TERNARY GOLDBACH PROBLEM | Hassan Nasreddine |
| 999 | NA | 2025 | 0 | OVERLAPPING CHEN–TYPE ALMOST-PRIME CONSTRAINTS IN THE TERNARY GOLDBACH PROBLEM | Hassan Nasreddine |
| 1000 | NA | 2025 | 0 | Schnirelmann Density and the Resolution of Additive Gaps in Waring-Goldbach Problems | Revista, Zen; MATH, 10 |
| 1001 | NA | 2025 | 0 | Schnirelmann Density and the Resolution of Additive Gaps in Waring-Goldbach Problems | Revista, Zen; MATH, 10 |
| 1002 | NA | 2025 | 0 | The exceptional set of Goldbach problem | Zhao, Genheng |
| 1003 | NA | 2025 | 0 | The exceptional set of Goldbach problem and Linnik's constant | Zhao, Genheng |
| 1004 | NA | 2025 | 0 | Cubic Waring-Goldbach problem with Piatetski-Shapiro primes | Linji Long; Jinjiang Li; Min Zhang; Yankun Sui |
| 1005 | NA | 2025 | 0 | OVERLAPPING CHEN–TYPE ALMOST-PRIME CONSTRAINTS IN THE TERNARY GOLDBACH PROBLEM | Hassan Nasreddine |
| 1006 | NA | 2025 | 0 | Multiple sums with the Möbius function | William D. Banks; Igor E. Shparlinski |
| 1007 | NA | 2025 | 0 | Two problems of number theory | Mykhaylo Khusid |
| 1008 | NA | 2025 | 0 | A Conditional Proof of a Strengthened Ternary Goldbach | Hassan Nasreddine |
| 1009 | NA | 2025 | 0 | Refinements of the Ternary Goldbach Theorem: Representations with Constrained Pair Sums | Hassan Nasreddine |
| 1010 | NA | 2025 | 0 | Improvements on exponential sums related to Piatetski-Shapiro primes | Lu Li; Lingyu Guo; Victor Zhenyu Guo |
| 1011 | NA | 2025 | 0 | Refinements of the Ternary Goldbach Theorem: Representations with Constrained Pair Sums | Hassan Nasreddine |
| 1012 | NA | 2025 | 0 | Prime Curvature Geometry and the Structure of Additive Prime Deviations | Bill Riemers |
| 1013 | NA | 2025 | 0 | Symmetric Goldbach Pairs Near 2a and Their Connection to OEIS A212595 | Paul Alexander Bilokon |
| 1014 | NA | 2025 | 0 | Metaformalism: Generation, Selection, and the Emergence of Stable Reality | David Sepiashvili |
| 1015 | NA | 2025 | 0 | Metaformalism: Generation, Selection, and the Emergence of Stable Reality | David Sepiashvili |
| 1016 | NA | 2025 | 0 | The Master Arithmetic System Eζ | DURAND, SERGE |
| 1017 | NA | 2025 | 0 | The Master Arithmetic System Eζ | DURAND, SERGE |
| 1018 | NA | 2025 | 0 | Diophantine approximation with mixed powers of Piatetski-Shapiro primes | S. I. Dimitrov |
| 1019 | NA | 2025 | 0 | On a system of two Diophantine inequalities with six prime variables | Long, Linji; Jinjiang Li; Zhang, Min; Sun, Rui |
| 1020 | NA | 2025 | 0 | Analytic and Conditional Resolution Framework for Goldbach’s Conjecture: From Mirror Prime Densities to Two-Lemma Reduction | Bouchaib Bahbouhi |
| 1021 | NA | 2025 | 0 | Almost primes and primes that are sums of two squares plus one | Kunjakanan Nath; Likun Xie |
| 1022 | NA | 2025 | 0 | Optimal bounds for sums of bounded arithmetic functions | Chirre, Andrés; Helfgott, Harald Andrés |
| 1023 | NA | 2025 | 0 | Absolute Analytical Proof of Goldbach’s Conjecture through the Curvature of Prime Density — The λ-Symmetry Theorem | Bouchaib Bahbouhi |
| 1024 | NA | 2025 | 0 | A Constructive Proof of Goldbach's Conjecture | Jarles Marimon |
| 1025 | NA | 2025 | 0 | On Prime Number-Jump Number Equation (PJE) and Goldbach's Conjecture | Farzad Mohebbi |
| 1026 | NA | 2025 | 0 | The Prime Generator Theorem: A Method of Formal Proof of Goldbach's Conjecture | Nolan Aljaddou |
| 1027 | NA | 2025 | 0 | A Binary Tree Approach to Proving Goldbach's Conjecture | Budee U Zaman |
| 1028 | NA | 2025 | 0 | Goldbach's conjecture proof By Wadï Mami | Mami, Wadï |
| 1029 | NA | 2025 | 0 | Goldbach's Conjecture: A Structural Proof via the Goldbach-Jacobsthal Bound | Clifford Keeble |
| 1030 | NA | 2025 | 0 | Goldbach's Conjecture: A Structural Proof via the Goldbach-Jacobsthal Bound | Clifford Keeble |
| 1031 | NA | 2025 | 0 | Nguyen's Evidence for Goldbach's Conjecture: Prime is Odd A Structural Explanation for Why Every Even Number is the Sum of Two Primes | V.Q Nguyen |
| 1032 | NA | 2025 | 0 | Nguyen's Evidence for Goldbach's Conjecture: Prime is Odd A Structural Explanation for Why Every Even Number is the Sum of Two Primes | V.Q Nguyen |
| 1033 | NA | 2025 | 0 | A Binary Tree Approach to Proving Goldbach's Conjecture | Budee U Zaman |
| 1034 | NA | 2025 | 0 | Combinatorial Proof of Goldbach's Conjecture and the Infinitude of Twin Primes | SOUZA DE ASSIS, ALTAIR |
| 1035 | NA | 2025 | 0 | Combinatorial Proof of Goldbach's Conjecture and the Infinitude of Twin Primes | SOUZA DE ASSIS, ALTAIR |
| 1036 | NA | 2025 | 0 | A methodology of Using the Decomposition of Odd Pairs in Relation to Goldbach's Conjecture | NGHIEM, BAO THINH |
| 1037 | NA | 2025 | 0 | A methodology of Using the Decomposition of Odd Pairs in Relation to Goldbach's Conjecture | NGHIEM, BAO THINH |
| 1038 | NA | 2025 | 0 | A methodology of Using the Decomposition of Odd Pairs in Relation to Goldbach's Conjecture | NGHIEM, BAO THINH |
| 1039 | NA | 2025 | 0 | Analysis of the Semantic Constructive Root- Cause Solution Mechanism for Goldbach's Conjecture | Yucong Duan; Shuaishuai Huang |
| 1040 | NA | 2025 | 0 | A Solution to Goldbach's Conjecture Based on Differential-Algebraic Finite Representation Theory | shifa liu |
| 1041 | NA | 2025 | 0 | A Solution to Goldbach's Conjecture Based on Differential-Algebraic Finite Representation Theory | shifa liu |
| 1042 | NA | 2025 | 0 | The Essence of Goldbach's Conjecture: Reconstruction of Consciousness BUG Theory and DIKWP Semantic Generation Mechanism | Yucong Duan; Shuaishuai Huang; Shiming Gong |
| 1043 | NA | 2025 | 0 | The Paradox of Statistical Collapse in Goldbach's Conjecture: An Approach Based on the Laplace Distribution and the Dirac Delta Function | Mozetic, Maximiliano |
| 1044 | NA | 2025 | 0 | The Paradox of Statistical Collapse in Goldbach's Conjecture: An Approach Based on the Laplace Distribution and the Dirac Delta Function | Mozetic, Maximiliano |
| 1045 | NA | 2025 | 0 | The Goldbach-Sicoli Theorem: A Complete Solution to Goldbach's Conjecture Through Additive Symmetry and Asymptotic Coverage Analysis | John Paul Sicoli |
| 1046 | NA | 2025 | 0 | The Irreducible Structure of the Prime Distribution - A Constructive Model of Fixpoints, Global Causality, and the Structural Foundations of the Riemann Hypothesis and Goldbach's Conjecture | Karl Jochen Heinz |
| 1047 | NA | 2025 | 0 | The Irreducible Structure of the Prime Distribution - A Constructive Model of Fixpoints, Global Causality, and the Structural Foundations of the Riemann Hypothesis and Goldbach's Conjecture | Heinz, Karl Jochen Heinz |
| 1048 | NA | 2025 | 0 | On a method to find prime numbers: Jump number approach | Farzad Mohebbi |
| 1049 | NA | 2025 | 0 | Sieving Schnirelmann Density: Quantitative Bounds in Additive Number Theory Beyond Goldbach and Waring | Revista, Zen; MATH, 10 |
| 1050 | NA | 2025 | 0 | Sieving Schnirelmann Density: Quantitative Bounds in Additive Number Theory Beyond Goldbach and Waring | Revista, Zen; MATH, 10 |
| 1051 | NA | 2025 | 0 | Primes are KS fundamentally random (but in Hilbert arithmetic, not in the standard mathematics) | Васил Пенчев |
| 1052 | NA | 2025 | 0 | Discrete Arithmetic Dynamics: Universal Friction and Automata Barriers in Number Theory | Lukas Cain |
| 1053 | NA | 2025 | 0 | Discrete Arithmetic Dynamics: Universal Friction and Automata Barriers in Number Theory | Cain, Lukas |
| 1054 | NA | 2025 | 0 | Discrete Arithmetic Dynamics: Universal Friction and Automata Barriers in Number Theory | Lukas Cain |
| 1055 | NA | 2025 | 0 | Discrete Arithmetic Dynamics: Universal Friction and Automata Barriers in Number Theory | Cain, Lukas |
| 1056 | NA | 2025 | 0 | Seo Series II: Structural Stability in Arithmetic and Dynamical Systems – Resolving Goldbach, Twin Primes, and the Collatz Conjecture via Entropy Barriers | Seo, Wonbin |
| 1057 | NA | 2025 | 0 | Seo Series II: Structural Stability in Arithmetic and Dynamical Systems – Resolving Goldbach, Twin Primes, and the Collatz Conjecture via Entropy Barriers | Seo, Wonbin |
| 1058 | NA | 2025 | 0 | Emergent Schnirelmann Densities: Unveiling the Fine Structure of Goldbach-Waring Bases | Revista, Zen; MATH, 10 |
| 1059 | NA | 2025 | 0 | The Fundamental Theorem of Structural Stability: A Grand Unification of Analytic, Arithmetic, and Algebraic Domains via Seo's Theorem | Seo, Wonbin |
| 1060 | NA | 2025 | 0 | Emergent Schnirelmann Densities: Unveiling the Fine Structure of Goldbach-Waring Bases | Revista, Zen; MATH, 10 |
| 1061 | NA | 2025 | 0 | The Fundamental Theorem of Structural Stability: A Grand Unification of Analytic, Arithmetic, and Algebraic Domains via Seo's Theorem | Seo, Wonbin |
| 1062 | NA | 2025 | 0 | A Unified Approach to Goldbach and Waring via Quantitative Schnirelmann Density | Revista, Zen; MATH, 10 |
| 1063 | NA | 2025 | 0 | A Unified Approach to Goldbach and Waring via Quantitative Schnirelmann Density | Revista, Zen; MATH, 10 |
| 1064 | NA | 2025 | 0 | Goldbach’s Conjecture as a Direct Deduction of Dynamic Symmetry and Invariant Prime Windows | Bouchaib Bahbouhi |
| 1065 | NA | 2025 | 0 | The Unified Prime Equation (UPE) Gives a Formal Proof for Goldbach’s Strong Conjecture and Its Elevation to the Status of a Theorem | Bouchaib Bahbouhi |
| 1066 | NA | 2025 | 0 | Can we follow the omega rule? | Brett Topey |
| 1067 | NA | 2025 | 0 | Optimal Symmetric Bounds on P | Jabari Zakiya; Jabari Zakiya |
| 1068 | NA | 2025 | 0 | Does Imagination Justify the Belief that Supra-Persons Are Physically Possible? | Alexandru Dragomir; Mihai Rusu |
| 1069 | NA | 2025 | 0 | Rethinking Parity Interpretation in the Wu Experiment | Gao Yankun |
| 1070 | NA | 2025 | 0 | Proving Fermat’s Last Theorem Using Partial Differences of Powers and the Binomial Theorem | Charles Kusniec |
| 1071 | NA | 2025 | 0 | On a rigidity property for quadratic gauss sums | Alexander P. Mangerel |
| 1072 | NA | 2025 | 0 | Quantum Fractal-Logical Unified Field 2.0: A Comprehensive Mathematical and Physical Framework | Enrique Vidal Silvente |
| 1073 | NA | 2025 | 0 | Philosophical and mathematical reflection on Riemann’s hypothesis. II The ontomathematical proof of Riemann’s hypothesis in Hilbert arithmetic | Vasil Dinev Penchev |
| 1074 | NA | 2025 | 0 | Waring and Waring-Goldbach subbases with prescribed representation function | Christian Táfula |
| 1075 | NA | 2025 | 0 | Philosophical and mathematical reflection on Riemann’s hypothesis. II The ontomathematical proof of Riemann’s hypothesis in Hilbert arithmetic | Васил Пенчев |
| 1076 | NA | 2025 | 0 | 2D-Curri-DPO: Two-Dimensional Curriculum Learning for Direct Preference Optimization | Mengyang Li; Zhong Zhang |
| 1077 | NA | 2025 | 0 | On a whim | Jesse Hill |
| 1078 | NA | 2025 | 0 | Transfinite Fixed-Point Games and the Resolution of Open Problems in Alpay Algebra | Faruk Alpay |
| 1079 | NA | 2025 | 0 | Parallel Paradigms in Modern HPC: A Comparative Analysis of MPI, OpenMP, and CUDA | Nizar Alhafez; Ahmad Kurdi |
| 1080 | NA | 2025 | 0 | Symbolic Field Theory and Irreducible Emergence: From Collapse Fields to Prime Recurrence | Triston Miller |
| 1081 | NA | 2025 | 0 | Naturalistic intuitionism for physics | Bruno Bentzen; Flavio Del Santo; Nicolas Gisin |
| 1082 | NA | 2025 | 0 | Deduction-Projection Estimators for Understanding Neural Networks | Wu, Gabriel |
| 1083 | NA | 2025 | 0 | Planetary fine-tuning, cosmological fine-tuning, and the multiverse | Bradford Saad |
| 1084 | NA | 2025 | 0 | Cognitive phenomenology and the arbitrariness problem for rationalism | Torrance Fung |
| 1085 | NA | 2025 | 0 | Philosophical and mathematical reflection on Riemann’s hypothesis. I Reframing in Hilbert arithmetic | Васил Пенчев |
| 1086 | NA | 2025 | 0 | Is Mathematics Like a Game? | Klaas Landsman; Kirti Singh |
| 1087 | NA | 2025 | 0 | The Invention of the "Ignorance Awareness Factor (अ)" - A Conceptual Frontier Notation for the "Awareness of Unknown" for Conscious Decision Making in Humans & Machines | Vadagam, Kiran |
| 1088 | NA | 2024 | 9 | Was Wittgenstein a radical conventionalist? | Ásgeir Berg |
| 1089 | NA | 2024 | 3 | Towards a polarized semantics for assertion and denial | Massimiliano Carrara; Daniele Chiffi; Ciro De Florio |
| 1090 | NA | 2024 | 2 | An algorithm and computation to verify Legendre’s conjecture up to $$7\cdot 10^{13}$$ | Jonathan Sorenson; Jonathan Webster |
| 1091 | NA | 2024 | 2 | Epistemic logic with partial grasp | Francisca Silva |
| 1092 | NA | 2024 | 1 | Research on the Goldbach Conjecture | Yichun Xiao |
| 1093 | NA | 2024 | 1 | On the binary Goldbach conjecture under primorial-based constraints | R Laniewski |
| 1094 | NA | 2024 | 1 | Achieving quantum advantage in a search for a violations of the Goldbach conjecture, with driven atoms in tailored potentials | Oleksandr V. Marchukov; Andrea Trombettoni; Giuseppe Mussardo; Maxim Olshanii |
| 1095 | NA | 2024 | 1 | A Sieve-Theoretic Reformulation of the Goldbach Conjecture | Bill Riemers |
| 1096 | NA | 2024 | 1 | Discover a Proof of Goldbach's Conjecture | Budee U Zaman |
| 1097 | NA | 2024 | 1 | Vector-Matrix Reversal Operation | Ramon Carbó‐Dorca |
| 1098 | NA | 2024 | 1 | Resonance Cascades and Number Theory | Oleksandr V. Marchukov; Maxim Olshanii |
| 1099 | NA | 2024 | 1 | On the distribution of modular square roots of primes | Ilya D. Shkredov; Igor E. Shparlinski; Alexandru Zaharescu |
| 1100 | NA | 2024 | 1 | Combinatorics on words and generating Dirichlet series of automatic sequences | Jean‐Paul Allouche; Jeffrey Shallit; Manon Stipulanti |
| 1101 | NA | 2024 | 1 | Enumeration of N-dimensional Hypercube, Icosahedral, Rubik’s Cube Dice, Colorings and Encryptions Based on Their Symmetries | K. Balasubramanian |
| 1102 | NA | 2024 | 1 | Mathematical Analysis of Teaching Art and its Effect On Packaging Design Give Lessons | Hu Guo; Hao Chen; Xuan Li; Karim Chelli; Adel Ali Yassin Alzyoud |
| 1103 | NA | 2024 | 1 | Temporal Direction, Intuitionism and Physics | Yuval Dolev |
| 1104 | NA | 2024 | 1 | Six Dimensions for Proof of Riemann Hypothesis | Seyed Kazem Mousavi |
| 1105 | NA | 2024 | 1 | The Incompleteness of Central Planning | Hai-Trieu v. Nguyen |
| 1106 | NA | 2024 | 0 | Goldbach Conjecture Proof | Daniel C. Thompson |
| 1107 | NA | 2024 | 0 | Goldbach Conjecture Proof | Daniel C. Thompson |
| 1108 | NA | 2024 | 0 | Goldbach Conjecture Proof | Daniel C. Thompson |
| 1109 | NA | 2024 | 0 | Proof of the Binary Goldbach Conjecture | PHILIPPE SAINTY |
| 1110 | NA | 2024 | 0 | THE ORDER OF NUMBERS AND THE GOLDBACH CONJECTURE | Jacqueline Wötzel |
| 1111 | NA | 2024 | 0 | Proof of the Goldbach Conjecture by Extension to the Negative Number Line and Using a Probabilistic Approach | Xinyi Zhou |
| 1112 | NA | 2024 | 0 | Proof of the Goldbach Conjecture by extension to the negative number line and using a probabilistic approach | Xinyi Zhou |
| 1113 | NA | 2024 | 0 | A Deterministic Approach to the Goldbach Conjecture through Domain Theory | Paul Bilokon |
| 1114 | NA | 2024 | 0 | Equation-Based Exploration of the Goldbach Conjecture in Quadrant I Coordinate Systems | Budee U Zaman |
| 1115 | NA | 2024 | 0 | The Generating Functions and Goldbach Conjecture | Hui Yang |
| 1116 | NA | 2024 | 0 | A Simple Proof for Goldbach Conjecture | Masoud Allame |
| 1117 | NA | 2024 | 0 | Proof of the Binary Goldbach Conjecture&nbsp; | Philippe Sainty |
| 1118 | NA | 2024 | 0 | Digitally Restricted Sets and the Goldbach Conjecture: An Exceptional Set Result | James Cumberbatch |
| 1119 | NA | 2024 | 0 | A Probabilistic Domain-Theoretic Framework for the Goldbach Conjecture Using Local Scott Compactification | Paul Bilokon |
| 1120 | NA | 2024 | 0 | Confirming Buya's and Bezaleel's proof of the Binary Goldbach conjecture using Bertrand's postulate [Version 2] | Samuel Buya Bonaya |
| 1121 | NA | 2024 | 0 | Confirming Buya's and Bezaleel's Proof of the Binary Goldbach Conjecture using Bertrand's Postulate Paper Title | Samuel Buya Bonaya |
| 1122 | NA | 2024 | 0 | Almost all primes are not needed in Ternary Goldbach | Debmalya Basak; Raghavendra N. Bhat; Dong, Anji; Alexandru Zaharescu |
| 1123 | NA | 2024 | 0 | Conjectures on Partitions of Integers As Summations of Primes | Florentín Smarandache |
| 1124 | NA | 2024 | 0 | Cancellation in sums over special sequences on $\mathbf{\rm{GL}_{m}}$ and their applications | Qiang Ma; Rui Zhang |
| 1125 | NA | 2024 | 0 | Collatz Invariant Even Numbers <br> | R Laniewski |
| 1126 | NA | 2024 | 0 | On the Natural Numbers that cannot be Expressed as a Sum of Two Primes | Péter Szabó |
| 1127 | NA | 2024 | 0 | On the Natural Numbers that cannot be Expressed as a Sum of Two Primes | Péter Szabó |
| 1128 | NA | 2024 | 0 | Goldbach theorems for group semidomains | Eddy Li; Advaith Mopuri; Charles Zhang |
| 1129 | NA | 2024 | 0 | Prime Numbers and Gaps: A Unified Approach to Goldbach's Conjecture Using the Difference of Squares | Charles Kusniec |
| 1130 | NA | 2024 | 0 | THE TWIN PRIME, GOLDBACH AND COLLATZ CONJECTURES ARE TRUE | Idriss Aberkane |
| 1131 | NA | 2024 | 0 | Discover a Proof of Goldbach's Conjecture | Budee U Zaman |
| 1132 | NA | 2024 | 0 | S-invariant and S-multinvariant functions and some symmetry groups of algebraic sieves | Francesco Maltese |
| 1133 | NA | 2024 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1134 | NA | 2024 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka; Ali Shehu |
| 1135 | NA | 2024 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1136 | NA | 2024 | 0 | On the Natural Numbers that cannot be Expressed as a Sum of Two Primes | Péter Szabó |
| 1137 | NA | 2024 | 0 | Proof of Goldbach's Conjecture | Shaosheng Hou; Y. Huang; Lie Ma |
| 1138 | NA | 2024 | 0 | J. B. S. Haldane’s Rule of Succession | Eric‐Jan Wagenmakers; S. L. Zabell; Quentin F. Gronau |
| 1139 | NA | 2024 | 0 | Additive Bases: Change of Domain | Boris Bukh; Peter van Hintum; Peter Keevash |
| 1140 | NA | 2024 | 0 | Explicit estimates for the Goldbach summatory function | Gautami Bhowmik; Anne-Maria Ernvall-Hytönen; Neea Palojärvi |
| 1141 | NA | 2024 | 0 | Hassan Solution for Prime Numbers' Pattern of Distribution | Kowthar Salman Hassan |
| 1142 | NA | 2024 | 0 | Investigating Fractal Patterns and the Riemann Hypothesis | Budee U Zaman |
| 1143 | NA | 2024 | 0 | Odd-Prime Formula and the Complete Proofs of the Goldbach, Polignac, and Twin Prime Conjectures.pdf | Danny V Calcaben |
| 1144 | NA | 2024 | 0 | On the order of magnitude of certain integer sequences | Michael Hellus; Anton Rechenauer; Rolf Waldi |
| 1145 | NA | 2024 | 0 | On a multiplicative hybrid problem over almost-primes | Yuetong Zhao; Wenguang Zhai |
| 1146 | NA | 2024 | 0 | Hard Proofs and Good Reasons | Simon DeDeo |
| 1147 | NA | 2024 | 0 | On the diameter of a super-order-commuting graph | Janko Bračič; Bojan Kuzma |
| 1148 | NA | 2024 | 0 | Beals Solution | Jonathan Jared Wilson |
| 1149 | NA | 2024 | 0 | On Shusterman's Goldbach-type problem for sign patterns of the Liouville function | Alexander P. Mangerel |
| 1150 | NA | 2024 | 0 | On the error term in the explicit formula of Riemann-von Mangoldt II | Michaela Cully-Hugill; Daniel R. Johnston |
| 1151 | NA | 2024 | 0 | Goldbach's Problem in short intervals for numbers with a missing digit | Jiseong Kim |
| 1152 | NA | 2024 | 0 | $M$-functions and screw functions originating from Goldbach's problem and zeros of the Riemann zeta function | Kohji Matsumoto; Masatoshi Suzuki |
| 1153 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Junze Shi |
| 1154 | NA | 2024 | 0 | An algorithm and computation to verify Legendre's Conjecture up to $3.33\cdot10^{13}$ | Jonathan Sorenson; Jonathan Webster |
| 1155 | NA | 2024 | 0 | Gravity and the Riemannian Hypothesis | Junze Shi |
| 1156 | NA | 2024 | 0 | Fundamentos da Matemática | Carlos André Duarte Costa; Natércia de Andrade Lopes Neta |
| 1157 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Junze Shi |
| 1158 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Junze Shi |
| 1159 | NA | 2024 | 0 | Gaps Between Consecutive Primes and the Exponential Distribution | Joel E. Cohen |
| 1160 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Junze Shi |
| 1161 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 1162 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 1163 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 1164 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 1165 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 1166 | NA | 2024 | 0 | Curves on the torus with few intersections | Igor Balla; Marek Filakovský; Bartłomiej Kielak; Daniel Král͏̌; Niklas Schlomber |
| 1167 | NA | 2024 | 0 | Gravity and Riemann Hypothesis | Jun Ze Shi |
| 1168 | NA | 2024 | 0 | Strategies and Practices for Enhancing the Ideological and Political Teaching Ability of University Mathematics Teachers | Xiaoyan Li |
| 1169 | NA | 2024 | 0 | Density versions of the binary Goldbach problem | Ali Alsetri; Xuancheng Shao |
| 1170 | NA | 2024 | 0 | Representation of even Gaussian integer à la Chen | Soumyarup Banerjee; Habibur Rahaman |
| 1171 | NA | 2024 | 0 | Structure in prime gaps | KAJANI KAUNDA |
| 1172 | NA | 2024 | 0 | The Feit-Thompson Conjecture: An Example for Mathematical Research Based on Contradictory Sources | Carolin Hannusch |
| 1173 | NA | 2024 | 0 | Localization of unique factorization semidomains | Vı́ctor M. González; Harold Polo; Pedro Rodríguez |
| 1174 | NA | 2024 | 0 | A pair of Goldbach-Linnik equations in unlike powers of primes and powers of two | Liqun Hu; Siqi Liu |
| 1175 | NA | 2024 | 0 | Average orders of Goldbach Estimates in Arithmetic Progressions | Thi Thu Nguyen |
| 1176 | NA | 2024 | 0 | Investigating the Subadditivity of the Prime Counting Function π(z) and Its Implications for the Second Hardy–Littlewood Conjecture | Anshuman Padhi |
| 1177 | NA | 2024 | 0 | Exploring Prime Number Classification: Achieving High Recall Rate and Rapid Convergence with Sparse Encoding | Serin Lee; Sanghee Kim |
| 1178 | NA | 2024 | 0 | Structure in prime gaps | KAJANI KAUNDA |
| 1179 | NA | 2024 | 0 | Artifical intelligence and inherent mathematical difficulty | Walter Dean; Alberto Naibo |
| 1180 | NA | 2024 | 0 | Mathematical constraints and their philosophical impact | Adam Stiles |
| 1181 | NA | 2024 | 0 | Resolving the Collatz Conjecture: A Rigorous Proof through Inverse Discrete Dynamical Systems and Inverse Algebraic Trees | Eduardo Diedrich |
| 1182 | NA | 2024 | 0 | On Waring-Goldbach problem for one square and seventeen fifth powers of primes | Min Zhang; Jinjiang Li; Fei Xue |
| 1183 | NA | 2024 | 0 | On the representation of large even integers as the sum of eight primes from positive density sets | Meng Gao |
| 1184 | NA | 2024 | 0 | A Density Theorem for Higher Order Sums of Prime Numbers | Michael T. Lacey; Hamed Mousavi; Yaghoub Rahimi; Manasa N. Vempati |
| 1185 | NA | 2024 | 0 | Forms in prime variables and differing degrees | Jianya Liu; Sizhe Xie |
| 1186 | NA | 2024 | 0 | The distribution of powers of primes related to the Frobenius problem | Huang, Enxun; Zhu, Tengyou |
| 1187 | NA | 2024 | 0 | Exploring the Representation of Large Positive Integers as Sums of Prime Powers and Integer Powers: Analysis with Positive Density Subsets | Meng Gao |
| 1188 | NA | 2024 | 0 | Additive number theory and the Dyson transform | Melvyn B. Nathanson |
| 1189 | NA | 2024 | 0 | An asymptotic formula with power-saving error term for counting prime solutions to a binary additive problem | Rachita Guria |
| 1190 | NA | 2024 | 0 | On the trajectories of a particle in a translation invariant involutive field | Cristian Cobeli; Alexandru Zaharescu |
| 1191 | NA | 2024 | 0 | A Proof of the Erdos-Turan Conjecture on Asymptotic Additive Bases | Konstantinos Smpokos |
| 1192 | NA | 2024 | 0 | Arithmetic Ramsey theory over the primes | Jonathan Chapman; Sam Chow |
| 1193 | NA | 2024 | 0 | Partitio Numerorum: sums of squares and higher powers | Joerg Bruedern; Trevor D. Wooley |
| 1194 | NA | 2024 | 0 | Pointwise convergence of bilinear polynomial averages over the primes | Ben Krause; Hamed Mousavi; Terence Tao; Joni Teräväinen |
| 1195 | NA | 2024 | 0 | Exponential sums twisted by general arithmetic functions | Dong, Anji; Nicolas Robles; Alexandru Zaharescu; Dirk Zeindler |
| 1196 | NA | 2024 | 0 | Variation type characterization of product Hardy spaces | Laura Angelonı; Elijah Liflyand; Gianluca Vıntı |
| 1197 | NA | 2024 | 0 | On the moments of averages of Ramanujan sums | Shivani Goel; M. Ram Murty |
| 1198 | NA | 2024 | 0 | Laplace convolutions of weighted averages of arithmetical functions | Marco Cantarini; Alessandro Gambini; Alessandro Zaccagnini |
| 1199 | NA | 2024 | 0 | Quadratic Relations and Oblong Parabolic Prime Sieve: A New Approach to Goldbach's Conjecture | Charles Kusniec |
| 1200 | NA | 2024 | 0 | On Chen's theorem, Goldbach's conjecture and almost prime twins II | Runbo Li |
| 1201 | NA | 2024 | 0 | Groundbreaking Proof for Goldbach's Conjecture Using Mathematical Induction Formula Discovered | Budee U Zaman |
| 1202 | NA | 2024 | 0 | Sectional number of a morphism | Cesar A. Ipanaque Zapata |
| 1203 | NA | 2024 | 0 | A remark on large even integers of the form $p+P_3$ | Runbo Li |
| 1204 | NA | 2024 | 0 | Goldbach Representations with several primes | Thi Thu Nguyen |
| 1205 | NA | 2024 | 0 | Proof of Near-square Primes Problem | Jihyeon Yoon |
| 1206 | NA | 2024 | 0 | The average number of Goldbach representations over multiples of $q$ | Karin Ikeda; Suriajaya, Ade Irma |
| 1207 | NA | 2024 | 0 | Weighted sieves with switching | Kaisa Matomäki; Sebastian Zuniga Alterman |
| 1208 | NA | 2024 | 0 | Computable domains of a Halting Function | Abel Luis Peralta |
| 1209 | NA | 2024 | 0 | Analysis of the nontrivial zeros for the certain Dirichlet $L$-series | Xiao‐Jun Yang |
| 1210 | NA | 2024 | 0 | Limitations of the Method of Integration in Astro- and Fundamental Physics | Yang Cao |
| 1211 | NA | 2024 | 0 | The Chowla conjecture and Landau-Siegel zeroes | Mikko Jaskari; Stelios Sachpazis |
| 1212 | NA | 2024 | 0 | Averages with the Gaussian divisor: Weighted Inequalities and the Pointwise Ergodic Theorem | Christina Giannitsi; Nazar Miheisi; Hamed Mousavi |
| 1213 | NA | 2024 | 0 | DRS: Deep Question Reformulation With Structured Output | Zhecheng Li; Yiwei Wang; Bryan Hooi; Yujun Cai; Nanyun Peng; Kai-Wei Chang |
| 1214 | NA | 2024 | 0 | Chaotic Dynamics Derived from the Montgomery Conjecture: Application to Electrical Systems | Zeraoulia Rafik; Salas, Alvaro Humberto; Souad, Ayadi |
| 1215 | NA | 2024 | 0 | MEAN VALUES OF ARITHMETIC FUNCTIONS ON A SPARSE SET AND APPLICATIONS | Hengcai Tang; Jie Wu |
| 1216 | NA | 2024 | 0 | Analysis on Riemann Hypothesis with Cross Entropy Optimization and Reasoning | Kevin Li; Fulu Li |
| 1217 | NA | 2024 | 0 | AdaFSNet: Time Series Classification Based on Convolutional Network with a Adaptive and Effective Kernel Size Configuration | Haoxiao Wang; Bo Peng; Jianhua Zhang; Cheng Xu |
| 1218 | NA | 2024 | 0 | The Undecidability in the AI Other | Michael K. C. Thanga |
| 1219 | NA | 2024 | 0 | The omniscient speaker puzzle | Aleksander Domosławski |
| 1220 | NA | 2024 | 0 | Mathematics and Machine Creativity: A Survey on Bridging Mathematics with AI | Shizhe Liang; Wei Zhang; Tianyang Zhong; Liu, Tianming |
| 1221 | NA | 2024 | 0 | Programmed Mathematics | Liesbeth De Mol |
| 1222 | NA | 2023 | 72 | Large Language Model as Attributed Training Data Generator: A Tale of Diversity and Bias | Yue Yu; Yuchen Zhuang; Jieyu Zhang; Meng Yu; Alexander Ratner; Ranjay Krishna; J |
| 1223 | NA | 2023 | 10 | Higher uniformity of arithmetic functions in short intervals I. All intervals | Kaisa Matomäki; Xuancheng Shao; Terence Tao; Joni Teräväinen |
| 1224 | NA | 2023 | 6 | About the strong EULER-GOLDBACH conjecture. | Philippe Sainty |
| 1225 | NA | 2023 | 5 | Boosting Logical Reasoning in Large Language Models through a New Framework: The Graph of Thought | Bin Lei; pei-Hung Lin; Chunhua Liao; Caiwen Ding |
| 1226 | NA | 2023 | 5 | Machine-assisted discovery of integrable symplectic mappings | Timofey Zolkin; Yaroslav Kharkov; Sergei Nagaitsev |
| 1227 | NA | 2023 | 4 | The odyssey to next-generation computers: cognitive computers (κC) inspired by the brain and powered by intelligent mathematics | Yingxu Wang; Bernard Widrow; C. A. R. Hoare; Witold Pedrycz; Robert C. Berwick; |
| 1228 | NA | 2023 | 2 | Ternary Goldbach Conjecture implies ABC Conjecture | Dmitri Martila |
| 1229 | NA | 2023 | 2 | Vectorizing and distributing number‐theoretic transform to count Goldbach partitions on Arm‐based supercomputers | Ricardo Jesus; Tomás Oliveira e Silva; Michèle Weiland |
| 1230 | NA | 2023 | 2 | Integer Factorization by Quantum Measurements | Giuseppe Mussardo; Andrea Trombettoni |
| 1231 | NA | 2023 | 2 | Another Waring–Goldbach problem | Jörg Brüdern |
| 1232 | NA | 2023 | 2 | A new explicit formula in the additive theory of primes with applications I. The explicit formula for the Goldbach problem and the Generalized Twin Prime Problem | J. Pintz |
| 1233 | NA | 2023 | 2 | Primes with a missing digit: Distribution in arithmetic progressions and an application in sieve theory | Kunjakanan Nath |
| 1234 | NA | 2023 | 2 | The number of primes in short intervals and numerical calculations for Harman's sieve | Runbo Li |
| 1235 | NA | 2023 | 1 | About the strong EULER-GOLDBACH conjecture | PHILIPPE SAINTY |
| 1236 | NA | 2023 | 1 | Ternary Goldbach Conjecture implies Strong Goldbach Conjecture | Dmitri Martila |
| 1237 | NA | 2023 | 1 | Expressing Even Numbers Beyond 6 as Sums of Two Primes | Budee U Zaman |
| 1238 | NA | 2023 | 1 | A Comment on Dean's Construction of Prime Labelings on Ladders | S. J. Curran; M. A. Ollis |
| 1239 | NA | 2023 | 1 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1240 | NA | 2023 | 1 | Complex Circles of Partition and the Expansion Principles | Berndt Gensel; Theophilus Agama |
| 1241 | NA | 2023 | 1 | Proof of Beal Conjecture | Dmitri Martila |
| 1242 | NA | 2023 | 1 | Analyzing Twin Primes, Goldbach’s Strong Conjecture and Polignac’s Conjecture | Mercedes Orús–Lacort; Román Orús; Christophe Jouis |
| 1243 | NA | 2023 | 1 | Lemoine’s Conjecture: A Limited Solution Using Computers | Naren Dawar |
| 1244 | NA | 2023 | 1 | A Revıew of Mathematical Conjectures: Exploring Engaging Topics for University Mathematics Students | Robert Kosova; Rinela Kapçiu; Shkelqim Hajrulla; Anna Maria Kosova |
| 1245 | NA | 2023 | 1 | Monotone non-decreasing sequences of the Euler totient function | Terence Tao |
| 1246 | NA | 2023 | 1 | The Collatz Conjecture: A New Proof using Algebraic Inverse Trees | Eduardo Diedrich |
| 1247 | NA | 2023 | 1 | A minimalist version of the circle method and Diophantine problems over thin sets | Kirsti D. Biggs; Julia Brandes |
| 1248 | NA | 2023 | 1 | Waring's problem with restricted digits | Ben Green |
| 1249 | NA | 2023 | 1 | Ellipses and hyperbolas of decomposition of even numbers into pairs of prime numbers | Gennady Butov |
| 1250 | NA | 2023 | 1 | Modal Ontological Arguments | Gregory R. P. Stacey |
| 1251 | NA | 2023 | 1 | A Random Group with Local Data Realizing Heuristics for Number Field Counting | Brandon Alberts |
| 1252 | NA | 2023 | 0 | Some discussions on the Goldbach conjecture | Huixi Li |
| 1253 | NA | 2023 | 0 | Goldbach Conjecture Proof | Daniel B. Thompson |
| 1254 | NA | 2023 | 0 | The solution of Goldbach conjecture | Keyang Ding |
| 1255 | NA | 2023 | 0 | The asymptotic squeeze principle and the Binary Goldbach Conjecture | Theophilus Agama |
| 1256 | NA | 2023 | 0 | A Necessary and Sufficient Condition for Proof of the Binary Goldbach Conjecture. Proofs of Binary Goldbach, Andrica and Legendre Conjectures. Notes on the Riemann Hypothesis. (Edition 8D) | Samuel Bonaya Buya; John Bezaleel Nchima |
| 1257 | NA | 2023 | 0 | On the Existence of Prime Pairs for Every Even Natural Number Greater Than Two: An Elaborate and Rigorous Resolution of the Binary Goldbach Conjecture Through Parity Analysis and Prime Decomposition | Anshuman Padhi; Amman Mohapatra |
| 1258 | NA | 2023 | 0 | A necessary and sufficient condition for proof of the Binary Goldbach conjecture. Proofs of Binary Goldbach, Andrica and Legendre conjectures. Notes on the Riemann hypothesis. (Edition 8D) | Samuel Bonaya Buya; John Bezaleel Nchima |
| 1259 | NA | 2023 | 0 | A Necessary and Sufficient Condition for Proof of the Binary Goldbach Conjecture. Proofs of Binary Goldbach, Andrica and Legendre Conjectures. Notes on the Riemann Hypothesis. (Edition 8D) | Samuel Bonaya Buya; John Bezaleel Nchima |
| 1260 | NA | 2023 | 0 | Proving the Goldbach Conjecture: Algebraic Proofs and Predicting Prime Numbers | Oussama Basta |
| 1261 | NA | 2023 | 0 | A Goldbach theorem for Laurent polynomials with positive integer coefficients | Sophia Liao; Harold Polo |
| 1262 | NA | 2023 | 0 | Averages over the Gaussian Primes: Goldbach's Conjecture and Improving Estimates | Christina Giannitsi; Ben Krause; Michael T. Lacey; Hamed Mousavi; Yaghoub Rahimi |
| 1263 | NA | 2023 | 0 | Expressing Even Numbers Beyond 6 as Sums of Two Primes | Budee U Zaman |
| 1264 | NA | 2023 | 0 | On Primorial Numbers | Jonatan Gómez |
| 1265 | NA | 2023 | 0 | Twin primes as a consequence of Goldbach's conjecture | Héctor M. Núñez |
| 1266 | NA | 2023 | 0 | Twin primes as a consequence of Goldbach's conjecture | Héctor M. Núñez |
| 1267 | NA | 2023 | 0 | Implications of Ramsey Choice Principles in ZF | Lorenz Halbeısen; Riccardo Plati; Saharon Shelah |
| 1268 | NA | 2023 | 0 | Efficient Equidistribution of Nilsequences | James Leng |
| 1269 | NA | 2023 | 0 | Analytical Continuation of the Prime Numbers | Borros Arneth |
| 1270 | NA | 2023 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1271 | NA | 2023 | 0 | Empirical verification of a new generalisation of Goldbach's conjecture up to $10^{12}$ (or $10^{13}$) for all coefficients $\leq 40$ | Zsófia Juhász; Máté Bartalos; Péter Magyar; Gábor Farkas |
| 1272 | NA | 2023 | 0 | P versus NP Millennium Prize Problem is solved | Dmitri Martila |
| 1273 | NA | 2023 | 0 | A Goldbach theorem for Laurent series semidomains | Nathan O. Kaplan; Harold Polo |
| 1274 | NA | 2023 | 0 | Twin Prime Conjecture Proof | Daniel Thompson |
| 1275 | NA | 2023 | 0 | SOLVING TWO TOPICAL PROBLEMS | Pensioner,citizen of Ukraine,Independent Researcher; Khusid Mykhaylo |
| 1276 | NA | 2023 | 0 | The Counting Functions of Prime Pairs | Keyang Ding |
| 1277 | NA | 2023 | 0 | SOLVING TWO TOPICAL PROBLEMS | Khusid Mykhaylo |
| 1278 | NA | 2023 | 0 | J. B. S. Haldane's Rule of Succession | Eric‐Jan Wagenmakers; S. L. Zabell; Quentin F. Gronau |
| 1279 | NA | 2023 | 0 | Решение двух задач | Mykhaylo Khusid |
| 1280 | NA | 2023 | 0 | On Chen's theorem over Piatetski-Shapiro type primes and almost-primes | Jinjiang Li; Fei Xue; Min Zhang |
| 1281 | NA | 2023 | 0 | Goldbach's problems. | Mykhaylo Khusid |
| 1282 | NA | 2023 | 0 | Sur les conjectures de Goldbach forte et faible (quelques remarques historico-épistémologiques) | Daniel Parrochia |
| 1283 | NA | 2023 | 0 | A Conjecture On σ(n) Function | Sourav Mandal |
| 1284 | NA | 2023 | 0 | Multivariate circle of partitions and the squeeze principle | Theophilus Agama |
| 1285 | NA | 2023 | 0 | A Conjecture On σ(n) Function | Sourav Mandal |
| 1286 | NA | 2023 | 0 | Goldbach's problem and twin primes are infinite | Mykhaylo Khusid |
| 1287 | NA | 2023 | 0 | Breakthroughs in Cognitive Robots and AI Programming Underpinned by Discoveries in Intelligence Science and Software Science | Yingxu Wang |
| 1288 | NA | 2023 | 0 | Lemoine's Conjecture: A Limited Solution Using Computers | Naren Dawar |
| 1289 | NA | 2023 | 0 | On some algebraic and geometric extensions of Goldbach's conjecture | Alberto F. Boix; Danny A. J. Gómez–Ramírez |
| 1290 | NA | 2023 | 0 | Is it possible that the Goldbach's and Twins primes conjectures are true with an algebraic approach? | Juan Rojas |
| 1291 | NA | 2023 | 0 | Challenging Logical Monism | Aurna Mukherjee |
| 1292 | NA | 2023 | 0 | Remarks on additive representations of natural numbers | Runbo Li |
| 1293 | NA | 2023 | 0 | Some Results on Zumkeller Numbers | Sai Teja Somu; Andrzej Kukla; Duc Van Khanh Tran |
| 1294 | NA | 2023 | 0 | On the upper and lower bound orders of almost prime triples | Runbo Li |
| 1295 | NA | 2023 | 0 | Expected Utility from a Constructive Viewpoint | Kislaya Prasad |
| 1296 | NA | 2023 | 0 | Conjectures in number theory | Ahmed Asimi |
| 1297 | NA | 2023 | 0 | On sums of unequal powers of primes and powers of 2 | Yuhui Liu |
| 1298 | NA | 2023 | 0 | Harmonic Graphs Conjecture: Graph-Theoretic Attributes and their Number Theoretic Correlations | Felipe Correa |
| 1299 | NA | 2023 | 0 | Goldbach-Linnik type problems involving one prime, four prime cubes and powers of 2 | Han, Xue; Huafeng Liu |
| 1300 | NA | 2023 | 0 | Prime numbers as a uniqueness set of the parallelogram equation via the Goldbach's conjecture | Hee Chul Pak; Dongseung Kang |
| 1301 | NA | 2023 | 0 | AN OVERVIEW ON INTEGERS OF THE FORM \\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\mathbf{6}^\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\mathbit{n}\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\ +\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\ \\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\mathbf{1} | Rajiv Kumar; Satish Kumar; MUKESH KUMAR; DUSHIYANT KUMAR |
| 1302 | NA | 2023 | 0 | Möbius function and primes: an identity factory with applications | Olivier Ramaré; Sebastian Zuniga Alterman |
| 1303 | NA | 2023 | 0 | An original short proof of the Fermat last conjecture | Ikorong Annouk |
| 1304 | NA | 2023 | 0 | Analysis of the feasibility of integrating innovative education into higher mathematics education | Xiaobo Wen |
| 1305 | NA | 2023 | 0 | On covering systems of polynomial rings over finite fields | Huixi Li; Biao Wang; Chunlin Wang; Shaoyun Yi |
| 1306 | NA | 2023 | 0 | Investigation and Analysis of Pre-service Primary School Mathematics Teachers' Knowledge of History of Mathematics | Haiyan Wei |
| 1307 | NA | 2023 | 0 | Mathematical intuition, deep learning, and Robbins' problem | F. Thomas Bruss |
| 1308 | NA | 2023 | 0 | Sistem Kriptokompresi Menggunakan Algoritma Asimetris Rabin-P dan Algoritma Lossless Compression Golbach Code | Tri Joko Wardani; Imran Lubis; Kalvin Chiuloto |
| 1309 | NA | 2023 | 0 | Dummettʼs Anti-Realism about Mathematical Statements | Jan Štěpánek |
| 1310 | NA | 2023 | 0 | Dummettʼs Anti-Realism about Mathematical Statements | Jan Štěpánek |
| 1311 | NA | 2023 | 0 | Primes in arithmetic progressions to large moduli, and Goldbach beyond the square-root barrier | Jared Duker Lichtman |
| 1312 | NA | 2023 | 0 | A note on $θ_2$ | David H. Nguyen |
| 1313 | NA | 2023 | 0 | Non-Concentration of Primes in $Γ\backslash PSL_2(\mathbb{R})$ | Lauritz Streck |
| 1314 | NA | 2023 | 0 | Kolmogorov's Calculus of Problems and Its Legacy | Andrei Rodin |
| 1315 | NA | 2023 | 0 | How to Escape From the Simulation | Roman V. Yampolskiy |
| 1316 | NA | 2023 | 0 | Accepted proofs: Objective truth, or culturally robust | Andrew Granville |
| 1317 | NA | 2023 | 0 | A density version of Waring-Goldbach problem | Meng Gao |
| 1318 | NA | 2023 | 0 | On the Waring-Goldbach problem for two squares and four cubes | Min Zhang; Hongxin Bai; Jinjiang Li |
| 1319 | NA | 2023 | 0 | GOLDBACH'S PROBLEMS | Khusid Mykhaylo |
| 1320 | NA | 2023 | 0 | GOLDBACH'S PROBLEMS | Pensioner,citizen of Ukraine,(IndependentResearcherWetzlarGermany.; Khusid Mykha |
| 1321 | NA | 2023 | 0 | Sum of prime numbers | Mykhaylo Khusid |
| 1322 | NA | 2023 | 0 | Random Diophantine Equations in the Primes | Philip Holdridge |
| 1323 | NA | 2023 | 0 | Bounding zeta on the 1-line under the partial Riemann hypothesis | Andrés Chirre |
| 1324 | NA | 2023 | 0 | On additive and multiplicative decompositions of sets of integers composed from a given set of primes, II (Multiplicative decompositions) | Kálmán Győry; Lajos Hajdu; Andràs Sárközy |
| 1325 | NA | 2023 | 0 | The error term in counting prime pairs | Leon Chou; Summer Haag; Jake Huryn; Andrew Ledoan |
| 1326 | NA | 2023 | 0 | A Moebius sum | Olivier Ramaré |
| 1327 | NA | 2023 | 0 | Sums of proper divisors with missing digits | Kübra Benli̇; Giulia Cesana; Cécile Dartyge; Charlotte Dombrowsky; Lola Thompson |
| 1328 | NA | 2023 | 0 | The exceptional set for Diophantine approximation with mixed powers of prime variables | Yuhui Liu |
| 1329 | NA | 2023 | 0 | Exponential sums over Möbius convolutions with applications to partitions | Debmalya Basak; Nicolas Robles; Alexandru Zaharescu |
| 1330 | NA | 2023 | 0 | A function-field analogue of the Goldbach counting function and the associated Dirichlet series | Shigeki Egami; Kohji Matsumoto |
| 1331 | NA | 2023 | 0 | Variation Type Characterization of Product Hardy Spaces | Laura Angelonı; Elijah Liflyand; Gianluca Vıntı |
| 1332 | NA | 2023 | 0 | Quasifinite fields of prescribed characteristic and Diophantine dimension | Ivan D. Chipchakov; Boyan B. Paunov |
| 1333 | NA | 2023 | 0 | On Gaussian primes in sparse sets | Jori Merikoski |
| 1334 | NA | 2023 | 0 | Deep on Goldbach's conjecture | Frank Vega |
| 1335 | NA | 2023 | 0 | Lean on Goldbach's conjecture | Frank Vega |
| 1336 | NA | 2023 | 0 | The Proof: Goldbach's Conjecture | Aniket Bhattacharjee |
| 1337 | NA | 2023 | 0 | The Proof: Goldbach's Conjecture | Aniket Bhattacharjee |
| 1338 | NA | 2023 | 0 | The Proof: Goldbach's Conjecture | Aniket Bhattacharjee |
| 1339 | NA | 2023 | 0 | PROPOSAL OF DEMONSTRATION OF THE GOLDBACH'S CONJECTURE | Ŕemy Aumeunier |
| 1340 | NA | 2023 | 0 | Algerbraic Proof Of Goldbach's Conjecture | Muhammad Ameen Ben Hmida |
| 1341 | NA | 2023 | 0 | Prime Number Sequence Within Even Numbers | Jihyeon Yoon |
| 1342 | NA | 2023 | 0 | Prime Number Sequence Within Even Numbers | Jihyeon Yoon |
| 1343 | NA | 2023 | 0 | Prime Numbers and their Enigmatic Properties: A Journey through Number Theory | Amelia Said |
| 1344 | NA | 2023 | 0 | A simple estimate of the number of Goldbach pairs for N | G. Morpurgo |
| 1345 | NA | 2023 | 0 | Ellipses and hyperbolas of decomposition of even numbers into pairs of prime numbers | Gennady Butov |
| 1346 | NA | 2023 | 0 | Magic numbers in periodic sequences | Savinien Kreczman; Luca Prigioniero; Eric Rowland; Manon Stipulanti |
| 1347 | NA | 2023 | 0 | Ellipses and hyperbolas of decomposition of even numbers into pairs of prime numbers | Gennady Butov |
| 1348 | NA | 2023 | 0 | Ellipses and hyperbolas of decomposition of even numbers into pairs of prime numbers | Gennady Butov |
| 1349 | NA | 2023 | 0 | Ellipses and hyperbolas of decompositions of even numbers into pairs of prime numbers | Gennady Butov |
| 1350 | NA | 2023 | 0 | The Seven Millenium Problems & AT Math | Paul T E Cusack; P Cusack; Pte Cusack; P Cusack; Tec Paul; P Cusack; Paul T E Cu |
| 1351 | NA | 2023 | 0 | Vectroid Entangler 2 | Parker Emmerson |
| 1352 | NA | 2023 | 0 | Small scale distribution of linear patterns of primes | Mayank Pandey; Katharine Woo |
| 1353 | NA | 2023 | 0 | A solution to the Erdős-Sárközy-Sós problem on asymptotic Sidon bases of order 3 | Cédric Pilatte |
| 1354 | NA | 2023 | 0 | Friedman's "Long Finite Sequences'': The End of the Busy Beaver Contest | Michael Vielhaber; Mónica del Pilar Canales Chacon; Sergio Jara Ceballos |
| 1355 | NA | 2023 | 0 | Journal of Genius and Eminence Creating order in the mind: Borges’ paradoxical mirror | Eduardo Mizraji |
| 1356 | NA | 2023 | 0 | The explanatory and heuristic power of mathematics | Marianna Antonutti Marfori; Sorin Bangu; Emiliano Ippoliti |
| 1357 | NA | 2023 | 0 | Prime Distribution and Siegel Zeroes | Thomas Wright |
| 1358 | NA | 2023 | 0 | The Collatz Conjecture: A New Perspective from Algebraic Inverse Trees | Eduardo Diedrich |
| 1359 | NA | 2023 | 0 | Prime Numbers Networks: Visualizing and Characterizing Relationships Between Prime Numbers | Luciano da Fontoura Costa |
| 1360 | NA | 2023 | 0 | Exploring Asymmetric Encryption of Harmonious-Type Labeling and Coloring Topological Coding | Xiaohui Zhang; Jing Su; Bing Yao |
| 1361 | NA | 2023 | 0 | AGent: A Novel Pipeline for Automatically Creating Unanswerable Questions | Son Quoc Tran; Gia-Huy Do; Phong Nguyen-Thuan Do; Matt Kretchmar; Xinya Du |
| 1362 | NA | 2023 | 0 | Quartic polynomials in two variables do not represent all non-negative integers | Stanley Yao Xiao; Shuntaro Yamagishi |
| 1363 | NA | 2023 | 0 | Wittgenstein on Weyl: the law of the excluded middle and the natural numbers | Jann Paul Engler |
| 1364 | NA | 2023 | 0 | Is mathematics like a game? | Klaas Landsman; Kirti Singh |
| 1365 | NA | 2023 | 0 | A review of technical factors to consider when designing neural networks for semantic segmentation of Earth Observation imagery | Sam Khallaghi; J. Ronald Eastman; Lyndon Estes |
| 1366 | NA | 2022 | 11 | Baby Skyrmion crystals | Paul Leask |
| 1367 | NA | 2022 | 8 | Holographic realization of the prime number quantum potential | Donatella Cassettari; Giuseppe Mussardo; Andrea Trombettoni |
| 1368 | NA | 2022 | 4 | The ternary Goldbach problem with two Piatetski–Shapiro primes and a prime with a missing digit | Helmut Maier; Michael Th. Rassias |
| 1369 | NA | 2022 | 2 | The Goldbach Conjecture With Summands In Arithmetic Progressions | Juho Salmensuu |
| 1370 | NA | 2022 | 2 | Construction of the Goldbach Polynomial | Jason R. South |
| 1371 | NA | 2022 | 2 | Derivation of Digital-to-Analog Converter Architectures Based on Number Theory. | Xueyan Bai; Dan Yao; Yuanyang Du; Minh Tri Tran; Shogo Katayama; Jianglin Wei; Y |
| 1372 | NA | 2022 | 2 | Title Pending 1712 | William D’Alessandro |
| 1373 | NA | 2022 | 2 | Diophantine approximation by prime numbers of a special form | Tatiana Todorova |
| 1374 | NA | 2022 | 2 | Special Spirals are Produced by the ROTASE Galactic Spiral Equations with the Sequential Prime Numbers | Hongjun Pan |
| 1375 | NA | 2022 | 1 | Goldbach Conjecture and the Trichotomy Law | Aribam Uttam Sharma |
| 1376 | NA | 2022 | 1 | A Concise Proof of Goldbach Conjecture | Xin Wang |
| 1377 | NA | 2022 | 1 | The continuity of prime numbers can lead to even continuity(Goldbach conjecture) | Ling Xie |
| 1378 | NA | 2022 | 1 | An Algebraic Approach to the Goldbach and Polignac Conjectures Using Mihailescu's Theorem and $p$-adic Analysis | Jason R. South |
| 1379 | NA | 2022 | 1 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1380 | NA | 2022 | 1 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1381 | NA | 2022 | 1 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1382 | NA | 2022 | 1 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1383 | NA | 2022 | 1 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1384 | NA | 2022 | 1 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1385 | NA | 2022 | 1 | PADRÕES ESPECIAIS DE DISTRIBUIÇÃO DOS NÚMEROS PRIMOS: O n−QUADRADO ZETA | Jorge A. Avila; ELIELSOM MOREIRA; BIANCA GUIMARÃES |
| 1386 | NA | 2022 | 1 | A Cesàro average for an additive problem with an arbitrary number of prime powers and squares | Marco Cantarini; Alessandro Gambini; Alessandro Zaccagnini |
| 1387 | NA | 2022 | 0 | A progress on the binary Goldbach conjecture | Theophilus Agama |
| 1388 | NA | 2022 | 0 | Refute of Goldbach Conjecture | Dhruva Janardana |
| 1389 | NA | 2022 | 0 | A Simple Explanation for the Goldbach Conjecture | Ameneh Farhadian; Hamid Reza Fanai |
| 1390 | NA | 2022 | 0 | The method of representing Goldbach conjecture by set | Huang Shan |
| 1391 | NA | 2022 | 0 | The method of representing Goldbach conjecture by set | Huang Shan |
| 1392 | NA | 2022 | 0 | THE COMPLETE SHORT PROOF OF THE GOLDBACH CONJECTURE | Ikorong Annouk |
| 1393 | NA | 2022 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1394 | NA | 2022 | 0 | Pineapple Theorem ( A prime number formular and proof of Goldbach Conjecture) | Gibbs Kawinga |
| 1395 | NA | 2022 | 0 | Pineapple Theorem ( A prime number formular and proof of Goldbach Conjecture) | Gibbs Kawinga |
| 1396 | NA | 2022 | 0 | Complex Circles of Partition and the Asymptotic Binary Goldbach Conjecture | Theophilus Agama; Berndt Gensel |
| 1397 | NA | 2022 | 0 | About the strong EULER-GOLDBACH conjecture | Philippe Sainty |
| 1398 | NA | 2022 | 0 | Pineapple Theorem ( Derivation of a prime number formular ) | Gibbs Kawinga |
| 1399 | NA | 2022 | 0 | Goldbach Approach. A possible formula for calculating binary prime partitions of even numbers. | Eduardo Acuña |
| 1400 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1401 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1402 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1403 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1404 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1405 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1406 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1407 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1408 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1409 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1410 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1411 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1412 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1413 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1414 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1415 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1416 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1417 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1418 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1419 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1420 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1421 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1422 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1423 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1424 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1425 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1426 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1427 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1428 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1429 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1430 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1431 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1432 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1433 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1434 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1435 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1436 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1437 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1438 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1439 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1440 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1441 | NA | 2022 | 0 | The Inconsistency of Arithmetic — Based on Goldbach's Conjecture | Ralf Wüsthofen |
| 1442 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1443 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1444 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1445 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1446 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1447 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1448 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1449 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1450 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1451 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1452 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1453 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1454 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1455 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1456 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1457 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1458 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1459 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1460 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1461 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1462 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1463 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1464 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1465 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1466 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1467 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1468 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1469 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1470 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1471 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1472 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1473 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1474 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1475 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1476 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1477 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1478 | NA | 2022 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1479 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1480 | NA | 2022 | 0 | Goldbach's Conjecture — Towards the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1481 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1482 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1483 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1484 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1485 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1486 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1487 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1488 | NA | 2022 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1489 | NA | 2022 | 0 | The Asymptotic Binary Goldbach and Lemoine Conjectures | Theophilus Agama; Berndt Gensel |
| 1490 | NA | 2022 | 0 | An Analysis of the Goldbach Equation | Jason R. South |
| 1491 | NA | 2022 | 0 | Complex Circles of Partition and the Asymptotic Lemoine Conjecture | Theophilus Agama; Berndt Gensel |
| 1492 | NA | 2022 | 0 | An Analysis of the Goldbach Difference Equation | Jason R. South |
| 1493 | NA | 2022 | 0 | An Application of the Hardy-Ramanujan Theorem | Chukwunyere Kamalu |
| 1494 | NA | 2022 | 0 | Deep on Goldbach's conjecture | Frank Vega |
| 1495 | NA | 2022 | 0 | An Elementary Inconsistency | Ralf Wüsthofen |
| 1496 | NA | 2022 | 0 | The sequence of prime gaps is graphic | Péter L. Erdős; Gergely Harcos; Shubha R. Kharel; Péter Maga; Tamás Róbert Mezei |
| 1497 | NA | 2022 | 0 | Summing $$\mu (n)$$: a faster elementary algorithm | H. A. Helfgott; Lola Thompson |
| 1498 | NA | 2022 | 0 | Double Dirichlet series associated with arithmetic functions II | Kohji Matsumoto; Hirofumi Tsumura |
| 1499 | NA | 2022 | 0 | Problems related to Waring-Goldbach problem involving cubes of primes | Zhichun Zhai |
| 1500 | NA | 2022 | 0 | Prime Solutions of Diagonal Diophantine Systems | Alan Talmage |
| 1501 | NA | 2022 | 0 | The Exceptional Set in Goldbach's Problem with Almost Twin Primes | Lasse Grimmelt; Joni Teräväinen |
| 1502 | NA | 2022 | 0 | A Disproof of Weak Goldbach's Conjecture | Marko V. Jankovic |
| 1503 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1504 | NA | 2022 | 0 | Addition Tensor and Goldbach's Conjecture | Marko V. Jankovic |
| 1505 | NA | 2022 | 0 | Deep on Goldbach's conjecture | Frank Vega |
| 1506 | NA | 2022 | 0 | Deep on Goldbach's conjecture | Frank Vega |
| 1507 | NA | 2022 | 0 | Deep on Goldbach's conjecture | Frank Vega |
| 1508 | NA | 2022 | 0 | Deep on Goldbach's conjecture | Frank Vega |
| 1509 | NA | 2022 | 0 | Deep on Goldbach's conjecture | Frank Vega |
| 1510 | NA | 2022 | 0 | The Number of Even Integers Greater Than 2 that Satisfy Goldbach's Conjecture | Kyumin Nam |
| 1511 | NA | 2022 | 0 | Goldbach's Conjecture is Undecidable | Ralf Wüsthofen |
| 1512 | NA | 2022 | 0 | Proof of Goldbach's Conjecture | Jianming Yang |
| 1513 | NA | 2022 | 0 | Goldbach's Conjecture — A Strengthened Form | Ralf Wüsthofen |
| 1514 | NA | 2022 | 0 | The Number of Even Integers Greater Than 2 that Satisfy Goldbach's Conjecture | Kyumin Nam |
| 1515 | NA | 2022 | 0 | Conjecture on a Prime Number Generator | Bablu Chandra Dey - |
| 1516 | NA | 2022 | 0 | Ways to Skin the Zombie Cat: A Look at the Problems Associated with Chalmers's Zombie-Argument | Walter Scott Clifton |
| 1517 | NA | 2022 | 0 | Primality test. My second contribution. | Dante Servi |
| 1518 | NA | 2022 | 0 | The zeta(s) function. Endless spirals in search of their origin. | Dante Servi |
| 1519 | NA | 2022 | 0 | Primality test. My contribution. | Dante Servi |
| 1520 | NA | 2022 | 0 | Primality test. My contribution. | Dante Servi |
| 1521 | NA | 2022 | 0 | Riemann's Hypothesis. This is why it is true. (Integration). | Dante Servi |
| 1522 | NA | 2022 | 0 | Riemann's Hypothesis. It is true twice. | Dante Servi |
| 1523 | NA | 2022 | 0 | One Kind New Hybrid Power Mean and Its Computational Formulae | Li Wang; Xuexia Wang |
| 1524 | NA | 2022 | 0 | The zeta(s) function. Endless spirals in search of their origin. | Dante Servi |
| 1525 | NA | 2022 | 0 | The zeta(s) function. Endless spirals in search of their origin. | Dante Servi |
| 1526 | NA | 2022 | 0 | Primality test. My second contribution. | Dante Servi |
| 1527 | NA | 2022 | 0 | Prime Factors Networks | Luciano da Fontoura Costa |
| 1528 | NA | 2022 | 0 | Twin primes. Where they can be found. | Dante Servi |
| 1529 | NA | 2022 | 0 | Primality test. My second contribution. | Dante Servi |
| 1530 | NA | 2022 | 0 | Twin primes. Where they can be found. | Dante Servi |
| 1531 | NA | 2022 | 0 | Riemann's Hypothesis. This is why it is true. (Integration). | Dante Servi |
| 1532 | NA | 2022 | 0 | Riemann's Hypothesis. This is why it is true. | Dante Servi |
| 1533 | NA | 2022 | 0 | Riemann Hypothesis. This is why it is true. (Other helps to those interested verify) | Dante Servi |
| 1534 | NA | 2022 | 0 | Riemann's Hypothesis. This is why it is true. | Dante Servi |
| 1535 | NA | 2022 | 0 | Riemann's Hypothesis. This is why it is true. | Dante Servi |
| 1536 | NA | 2022 | 0 | Riemann's Hypothesis. This is why it is true. | Dante Servi |
| 1537 | NA | 2022 | 0 | Riemann Hypothesis. This is why it is true. (Other helps to those interested verify) | Dante Servi |
| 1538 | NA | 2022 | 0 | Riemann zeta function. Riemann Hypothesis and the axis of symmetry. | Dante Servi |
| 1539 | NA | 2022 | 0 | Factorization invariants of the additive structure of exponential Puiseux semirings | Harold Polo |
| 1540 | NA | 2022 | 0 | Riemann zeta function. Riemann Hypothesis and the axis of symmetry. | Dante Servi |
| 1541 | NA | 2022 | 0 | Science and Faith in Kant's First Critique | Everett Fulmer |
| 1542 | NA | 2022 | 0 | Formalizing Chemical Physics using the Lean Theorem Prover | Maxwell P. Bobbin; Samiha Sharlin; Parivash Feyzishendi; An Hong Dang; Catherine |
| 1543 | NA | 2022 | 0 | Philosophy as Conceptual Negotiation | Roberto Casati |
| 1544 | NA | 2021 | 16 | Review of Suppes 1957 Proposals For Division by Zero | James A. Anderson; J.A. Bergstra |
| 1545 | NA | 2021 | 9 | Objectivity in Mathematics, Without Mathematical Objects† | Markus Pantsar |
| 1546 | NA | 2021 | 5 | The Elementary Proof of the Riemann's Hypothesis | Jan Feliksiak |
| 1547 | NA | 2021 | 5 | A Generalization of Piatetski–Shapiro Sequences | Victor Zhenyu Guo; Jinyun Qi |
| 1548 | NA | 2021 | 3 | Expansion, divisibility and parity | H. A. Helfgott; Maksym Radziwiłł |
| 1549 | NA | 2021 | 2 | The Binary Goldbach Conjecture | Jan Feliksiak |
| 1550 | NA | 2021 | 2 | Note on the Goldbach Conjecture and Landau-Siegel Zeros | D. A. Goldston; Ade Irma Suriajaya |
| 1551 | NA | 2021 | 2 | Studies on Twin Primes in Goldbach Partitions of Even Numbers | Marcin Barylski |
| 1552 | NA | 2021 | 2 | Siegel zeros, twin primes, Goldbach's conjecture, and primes in short intervals | Kaisa Matomäki; Jori Merikoski |
| 1553 | NA | 2021 | 1 | On Primes of the Form 2x-q (where q is a prime less than or equal to x) and the Product of the Distinct Prime Divisors of an Integer (Revised): A Function Approach to Proving the Goldbach Conjecture by Mathematical Induction | Chukwunyere Kamalu |
| 1554 | NA | 2021 | 1 | Note on the Goldbach Conjecture and Landau-Siegel Zeros | D. A. Goldston; Ade Irma Suriajaya |
| 1555 | NA | 2021 | 1 | On the Distribution of the Nontrivial Zeros for the Dirichlet <em>L</em>-Functions | Xiao‐Jun Yang |
| 1556 | NA | 2021 | 1 | Canções para não serem esquecidas | Rodrigo Lauriano Soares |
| 1557 | NA | 2021 | 1 | Note on a note of Goldston and Suriajaya | John Friedlander; Henryk Iwaniec |
| 1558 | NA | 2021 | 1 | On squares in Piatetski–Shapiro sequences | Wei Zhang |
| 1559 | NA | 2021 | 1 | Brun's 1920 Theorem on Goldbach's Conjecture | James Farrugia |
| 1560 | NA | 2021 | 1 | Considerations for Goldbach's Strong Conjecture | Carleilton Severino Silva |
| 1561 | NA | 2021 | 0 | On Goldbach Conjecture | Mar Detic |
| 1562 | NA | 2021 | 0 | A Proof of Goldbach Conjecture | Zhi Li; Hua Li |
| 1563 | NA | 2021 | 0 | A constructive proof of the Goldbach conjecture | Michael J Caola |
| 1564 | NA | 2021 | 0 | The Goldbach Conjecture - A Definitive Proof | Peter G. Bass |
| 1565 | NA | 2021 | 0 | A Fresh Hope of Proving Goldbach Conjecture (1+1) | Ke Li |
| 1566 | NA | 2021 | 0 | The Binary Goldbach Conjecture and Circles of Partition | Berndt Gensel; Theophilus Agama |
| 1567 | NA | 2021 | 0 | Numbers of Goldbach Conjecture Occurence in Every Even Numbers | S. Mahdhi |
| 1568 | NA | 2021 | 0 | Proving Goldbach Conjecture by Function Method | Rizwan Rashid; Sümeyye Bal; Ajinder Kaur |
| 1569 | NA | 2021 | 0 | New Computing Model of $GN_eTM$ Turing Machine On Solving Even Goldbach Conjecture | Lin, Bogang |
| 1570 | NA | 2021 | 0 | An Attempt to Prove the Strong Goldbach Conjecture | Gregory M. Sobko |
| 1571 | NA | 2021 | 0 | The continuity of prime numbers can lead to even continuity(Goldbach conjecture) | Ling Xie |
| 1572 | NA | 2021 | 0 | The continuity of prime numbers can lead to even continuity(Goldbach conjecture) | Xie Ling |
| 1573 | NA | 2021 | 0 | The continuity of prime numbers can lead to even continuity(Goldbach conjecture) | Ling Xie |
| 1574 | NA | 2021 | 0 | Functional Proofs of Goldbach Conjecture | Tae Beom Lee |
| 1575 | NA | 2021 | 0 | The Goldbach Conjecture Holds for 60 | O. Kurwa |
| 1576 | NA | 2021 | 0 | Multimodal Social Network Dataset Based on Goldbach Conjecture Proved Event in Zhihu | Tingzhen Liu; Shijie Geng; Zhi-Quan Huang; Senxin Wu; Zixi Wang |
| 1577 | NA | 2021 | 0 | Goldbach Conjecture, Twin Primes Conjecture, and Bounded Gap Theorem in the Language of Number Theory | Matheus Pereira Lobo |
| 1578 | NA | 2021 | 0 | Goldbach's Conjecture - An Unexpected Outcome | Ralf Wüsthofen |
| 1579 | NA | 2021 | 0 | Goldbach's Conjecture - An Unexpected Outcome | Ralf Wüsthofen |
| 1580 | NA | 2021 | 0 | An Antinomy | Ralf Wüsthofen |
| 1581 | NA | 2021 | 0 | An Extension Of Vinogradov's Theorem | Uboho Unyah |
| 1582 | NA | 2021 | 0 | A Simple Criteria of Prime Numbers | Masami Yamane |
| 1583 | NA | 2021 | 0 | A Study of Some Equivalence Properties Of Primes (In Their Pairs) | Uboho Unyah |
| 1584 | NA | 2021 | 0 | The Goldbach Comet | Jan Feliksiak; Monica Feliksiak |
| 1585 | NA | 2021 | 0 | Arbitrarily Large Goldbach (Even) Integers. | Uboho Unyah |
| 1586 | NA | 2021 | 0 | Representation of even integers as a sum of squares of primes and powers of two | Shehzad Hathi |
| 1587 | NA | 2021 | 0 | On the prime distribution | Yong Zhao; Jianqin Zhou |
| 1588 | NA | 2021 | 0 | Restrictions to Goldbach’s Conjecture Using Bertrand’s Postulate, Initiation to a Proof | Anass Massoudi |
| 1589 | NA | 2021 | 0 | Some Inconsistence in Logic | Bertrand Wong |
| 1590 | NA | 2021 | 0 | A Probabilistic Approach to some Additive and Multiplicative Problems of Number Theory | Gregory M. Sobko |
| 1591 | NA | 2021 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1592 | NA | 2021 | 0 | On the Additive and Subtractive Representation of Even Numbers from Primes | Ali Shehu; Jetmira Uka |
| 1593 | NA | 2021 | 0 | Proof of the Goldbach's Conjecture | K.H.K. Geerasee Wijesuriya |
| 1594 | NA | 2021 | 0 | On The Erdös-Turán Additive Base Conjecture | Theophilus Agama |
| 1595 | NA | 2021 | 0 | On the least almost-prime in arithmetic progression | Jinjiang Li; Min Zhang; Yingchun Cai |
| 1596 | NA | 2021 | 0 | A6 《推油圖》斷共和三戰IDD:救世立法、非人魔鬼辭典與SARS-2唯一解藥 | Henry Hill |
| 1597 | NA | 2021 | 0 | IDD of World War III SB and Inhuman Devil's Dictionary and Legislation of Salvation | Henry Hill |
| 1598 | NA | 2021 | 0 | Bounds on the sum of (log(p))<sup>2</sup> Terms | Jan Feliksiak |
| 1599 | NA | 2021 | 0 | Bounds on the Number of Primes in Ramanujan Interval | Jan Feliksiak |
| 1600 | NA | 2021 | 0 | A note on two-term exponential sum and the reciprocal of the quartic Gauss sums | Wenpeng Zhang; Xingxing Lv |
| 1601 | NA | 2021 | 0 | On the sum of a prime and a square-free number with divisibility conditions | Shehzad Hathi; Daniel R. Johnston |
| 1602 | NA | 2021 | 0 | Complete Additivity, Complete Multiplicativity, and Leibniz-additivity on Rationals | Jorma K. Merikoski; Pentti Haukkanen; Timo Tossavainen |
| 1603 | NA | 2021 | 0 | The meaning of the infinitely great | Qing Li |
| 1604 | NA | 2021 | 0 | An Introduction to Number Theory | J. J. P. Veerman |
| 1605 | NA | 2021 | 0 | Solving the Binary Goldbach Problem | Kurmet Sultan |
| 1606 | NA | 2021 | 0 | The ternary Goldbach problem with a prime with a missing digit and primes of special types | Helmut Maier; Michael Th. Rassias |
| 1607 | NA | 2021 | 0 | Discrete multilinear maximal functions and number theory | Theresa C. Anderson |
| 1608 | NA | 2021 | 0 | On an equation by primes with one Linnik prime | S. I. Dimitrov |
| 1609 | NA | 2021 | 0 | Translation invariant quadratic forms and dense sets of primes | Lilu Zhao |
| 1610 | NA | 2021 | 0 | Examples from Elements of Theory of Computation | Mostafa Ghandehari; Samee U. Khan |
| 1611 | NA | 2021 | 0 | Diophantine equations in primes: density of prime points on affine hypersurfaces | Shuntaro Yamagishi |
| 1612 | NA | 2021 | 0 | Representation by sums of unlike powers | Jianya Liu; Lilu Zhao |
| 1613 | NA | 2021 | 0 | A modification of the linear sieve, and the count of twin primes | Jared Duker Lichtman |
| 1614 | NA | 2021 | 0 | The 2 Goldbach's Conjectures with Proof | Nikos Mantzakouras |
| 1615 | NA | 2021 | 0 | Goldbach's Conjecture and the Double Density of Occupation by the Union of the Series of Multiples of Primes | Pál Doroszlai; Horacio Keller |
| 1616 | NA | 2021 | 0 | Proof of Goldbach's Conjecture | Jean-Max Coranson-Beaudu |
| 1617 | NA | 2021 | 0 | Proof of the Goldbach's Conjecture | Juan Elias Millas Vera |
| 1618 | NA | 2021 | 0 | Proof of Twin Primes and Goldbach's Conjecture. | Nikos Mantzakouras |
| 1619 | NA | 2021 | 0 | Proposed Proofs of Goldbach's Conjecture et al. | Jan Ruijgrok |
| 1620 | NA | 2021 | 0 | Proof of Goldbach's Conjecture and Twin Prime Conjecture | Jaejin Lim |
| 1621 | NA | 2021 | 0 | Goldbach's conjecture. Because I think it's true. | Dante Servi |
| 1622 | NA | 2021 | 0 | Hardness of busy beaver value BB(15) | Tristan Stérin; Damien Woods |
| 1623 | NA | 2021 | 0 | On the hardness of knowing busy beaver values BB(15) and BB(5, 4). | Tristan Stérin; Damien Woods |
| 1624 | NA | 2021 | 0 | Existence of Prime Numbers | Glenn Patrick King Ang |
| 1625 | NA | 2021 | 0 | A Two-Part Defense of Institutional Mathematics | Eliott Samuel |
| 1626 | NA | 2021 | 0 | Graphic Math: A Collection of Interviews With Creators of Mathematically Themed Graphic Novels | Audrey Nasar |
| 1627 | NA | 2021 | 0 | Considerations for Goldbach's Strong Conjecture | Carleilton Severino Silva |
| 1628 | NA | 2021 | 0 | Through the route of particularization, in quest of a prime partition | Sitangsu Maitra |
| 1629 | NA | 2021 | 0 | De Dicto Cognitive Reason Contextualism | Saleh Afroogh |
| 1630 | NA | 2021 | 0 | Approximations to Landau’s problems on prime numbers | Jori Merikoski |
| 1631 | NA | 2021 | 0 | On the factorization invariants of the additive structure of exponential\n Puiseux semirings | Harold Polo |
| 1632 | NA | 2020 | 4 | Primes in arithmetic progressions to large moduli II: Well-factorable estimates | James Maynard |
| 1633 | NA | 2020 | 2 | Identification of Composite Combinations: Key to Validate Goldbach Conjecture | Manish Khare; Kalyanlakshmi Chitta |
| 1634 | NA | 2020 | 2 | A note on an average additive problem with prime numbers | Marco Cantarini; Alessandro Gambini; Alessandro Zaccagnini |
| 1635 | NA | 2020 | 2 | Condtional Bounds on Siegel Zeros | Gautami Bhowmik; Karin Halupczok |
| 1636 | NA | 2020 | 2 | The Probabilistic Heuristic Justification for the Goldbach's Strong Conjecture | Salman Mahmud |
| 1637 | NA | 2020 | 2 | Paradox, arithmetic and nontransitive logic | Jonathan Georg Dittrich |
| 1638 | NA | 2020 | 1 | On a Variant of the Elliott-Halberstam Conjecture and the Goldbach Conjecture. | Jing-Jing Huang; Huixi Li |
| 1639 | NA | 2020 | 1 | The importance of finding the upper bounds for prime gaps in order to solve the twin primes conjecture and the Goldbach conjecture | Andrea Berdondini |
| 1640 | NA | 2020 | 1 | The size of oscillations in the Goldbach conjecture | Michael J. Mossinghoff; Timothy S. Trudgian |
| 1641 | NA | 2020 | 1 | The Complexity of Number Theory | Frank Vega |
| 1642 | NA | 2020 | 1 | Numerical semigroups generated by primes | Michael Hellus; Anton Rechenauer; Rolf Waldi |
| 1643 | NA | 2020 | 1 | Waring–Goldbach problem: two squares and three biquadrates | Li Zhu |
| 1644 | NA | 2020 | 1 | Exceptional set in Waring–Goldbach problem: Two squares, two cubes and two sixth powers | Yuhui Liu |
| 1645 | NA | 2020 | 1 | Successive Addition of Digits of an Integer Number: On Properties and Role in Studying Distribution of Primes | Manish Khare; Kalyanlakshmi Chitta |
| 1646 | NA | 2020 | 0 | Proof of Goldbach Conjecture | Anze Zhou |
| 1647 | NA | 2020 | 0 | A Proof of Goldbach Conjecture | Xuan Ni |
| 1648 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1649 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1650 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1651 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1652 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1653 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1654 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1655 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1656 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1657 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1658 | NA | 2020 | 0 | The Goldbach Conjecture is False | James Edwin Rock |
| 1659 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1660 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1661 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1662 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1663 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1664 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1665 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1666 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1667 | NA | 2020 | 0 | The Twin Prime-Goldbach Conjecture | Spring Fang |
| 1668 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1669 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1670 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1671 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1672 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1673 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1674 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1675 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1676 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1677 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1678 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1679 | NA | 2020 | 0 | Goldbach Conjecture Proved Remarkably | A. A. Frempong |
| 1680 | NA | 2020 | 0 | Proof of Goldbach Conjecture | Mohammed zohal |
| 1681 | NA | 2020 | 0 | Refuting Logic of the Goldbach Conjecture in Riemann Analysis | Thomas Halley |
| 1682 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1683 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1684 | NA | 2020 | 0 | A strengthened form of the strong Goldbach conjecture | Ralf Wüsthofen |
| 1685 | NA | 2020 | 0 | Hyperbolic classification of natural numbers and Goldbach Conjecture | Fernando Revilla Jiménez |
| 1686 | NA | 2020 | 0 | Strong & Weak Goldbach Conjectures Proved Side-by-Side | A. A. Frempong |
| 1687 | NA | 2020 | 0 | The Operative Set Theory with Application to Goldbach Conjecture | Anze Zhou |
| 1688 | NA | 2020 | 0 | Identification of Composite Combinations: Key to Validate Goldbach Conjecture | Manish Khare; Kalyanlakshmi Chitta |
| 1689 | NA | 2020 | 0 | On Goldbach conjecture | Mohamed Mansour |
| 1690 | NA | 2020 | 0 | Proof of Goldbach Conjecture | Shan Wang |
| 1691 | NA | 2020 | 0 | A Sieve for Goldbach Conjecture | Xuan Ni |
| 1692 | NA | 2020 | 0 | On the Binary Goldbach Conjecture | Theophilus Agama; Berndt Gensel |
| 1693 | NA | 2020 | 0 | Prime numbers and the Goldbach conjecture | Mohamed Sghiar |
| 1694 | NA | 2020 | 0 | Elementary Proof that the Goldbach Conjecture Is False | Stephen M. Marshall |
| 1695 | NA | 2020 | 0 | The solution of Riemann conjecture and Goldbach conjecture derived from the sum of prime numbers | HuangShan |
| 1696 | NA | 2020 | 0 | The solution of Riemann conjecture and Goldbach conjecture derived from the sum of prime numbers | Shan, Hung |
| 1697 | NA | 2020 | 0 | The importance of finding the upper bounds for prime gaps in order to solve the twin primes conjecture and the Goldbach conjecture | Andrea Berdondini |
| 1698 | NA | 2020 | 0 | Goldbach's Racetrack | Rene van der Vegt |
| 1699 | NA | 2020 | 0 | Homogeneous Riemannian with Applications to Primes | Thomas Halley |
| 1700 | NA | 2020 | 0 | Goldbach's Conjecture - An Unexpected Simplicity | Ralf Wüsthofen |
| 1701 | NA | 2020 | 0 | Goldbach's Conjecture - An Unexpected Simplicity | Ralf Wüsthofen |
| 1702 | NA | 2020 | 0 | Goldbach's Conjecture - An Unexpected Simplicity | Ralf Wüsthofen |
| 1703 | NA | 2020 | 0 | Goldbach's Conjecture - An Unexpected Simplicity | Ralf Wüsthofen |
| 1704 | NA | 2020 | 0 | Goldbach's Conjecture - An Unexpected Simplicity | Ralf Wüsthofen |
| 1705 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1706 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1707 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1708 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1709 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1710 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1711 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1712 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1713 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1714 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1715 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1716 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1717 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1718 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1719 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1720 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1721 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1722 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1723 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1724 | NA | 2020 | 0 | An Algebraic Approach to the Goldbach and Polignac Conjectures | Jason R. South |
| 1725 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1726 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1727 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1728 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1729 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1730 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1731 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1732 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1733 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1734 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1735 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1736 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1737 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1738 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1739 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1740 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1741 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1742 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1743 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1744 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1745 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1746 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1747 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1748 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1749 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1750 | NA | 2020 | 0 | A Rigorous Geometric Proof of the Formula $\sum \limits_{k=1}^{n}(2k-1)=n^2$ and Its Connection to the Binary Goldbach Problem | Theophilus Agama |
| 1751 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1752 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1753 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1754 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1755 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1756 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1757 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1758 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1759 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1760 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1761 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1762 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1763 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1764 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1765 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1766 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1767 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1768 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1769 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1770 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1771 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1772 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1773 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1774 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1775 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1776 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1777 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1778 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1779 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1780 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1781 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1782 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1783 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1784 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1785 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1786 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1787 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1788 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1789 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1790 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1791 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1792 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1793 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1794 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1795 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1796 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1797 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1798 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1799 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1800 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1801 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1802 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1803 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1804 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1805 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1806 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1807 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1808 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1809 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1810 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1811 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1812 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1813 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1814 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1815 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1816 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1817 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1818 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1819 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1820 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1821 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1822 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1823 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1824 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1825 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1826 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1827 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1828 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1829 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1830 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1831 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1832 | NA | 2020 | 0 | An Inconsistency | Ralf Wüsthofen |
| 1833 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1834 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1835 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1836 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1837 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1838 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1839 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1840 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1841 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1842 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1843 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1844 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1845 | NA | 2020 | 0 | The Circle Embedding Method and Applications | Theophilus Agama; Berndt Gensel |
| 1846 | NA | 2020 | 0 | Naturally Numbers Are Three Plus One Dimensional Final Version | Surajit Ghosh |
| 1847 | NA | 2020 | 0 | Number Theory and Cosmology and Particle Physics | Surajit Ghosh |
| 1848 | NA | 2020 | 0 | Naturally Numbers Are Three Plus One Dimensional Final | Surajit Ghosh |
| 1849 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1850 | NA | 2020 | 0 | The Complexity of Goldbach's Conjecture | Frank Vega |
| 1851 | NA | 2020 | 0 | The Complexity of Goldbach's Conjecture | Frank Vega |
| 1852 | NA | 2020 | 0 | The Complexity of Goldbach's Conjecture | Frank Vega |
| 1853 | NA | 2020 | 0 | The Complexity of Goldbach's Conjecture | Frank Vega |
| 1854 | NA | 2020 | 0 | The Complexity of Goldbach's Conjecture | Frank Vega |
| 1855 | NA | 2020 | 0 | A Probabilistic Approach to some Problems of Number Theory | Gregory M. Sobko |
| 1856 | NA | 2020 | 0 | L versus P | Frank Vega |
| 1857 | NA | 2020 | 0 | L versus P | Frank Vega |
| 1858 | NA | 2020 | 0 | The Complexity of Number Theory | Frank Vega |
| 1859 | NA | 2020 | 0 | L versus P | Frank Vega |
| 1860 | NA | 2020 | 0 | L versus P | Frank Vega |
| 1861 | NA | 2020 | 0 | The Complexity of Number Theory | Frank Vega |
| 1862 | NA | 2020 | 0 | The Complexity of Number Theory | Frank Vega |
| 1863 | NA | 2020 | 0 | 1. Biological phenomena and prime numbers | Marinos Spiliopoulos |
| 1864 | NA | 2020 | 0 | Prime numbers, Goldbach's conjecture, De Polignac's conjecture, Legendre's conjecture, and Landau's conjecture | Mohamed Sghiar |
| 1865 | NA | 2020 | 0 | On the Erd\H{o}s-Tur\'{a}n additive base conjecture | Theophilus Agama |
| 1866 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1867 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1868 | NA | 2020 | 0 | STUDIES IN ADDITIVE NUMBER THEORY BY CIRCLES OF PARTITION | Theophilus Agama; Berndt Gensel |
| 1869 | NA | 2020 | 0 | An Additive Problem over Piatetski-Shapiro Primes and Almost-primes | Jinjiang Li; Min Zhang |
| 1870 | NA | 2020 | 0 | A note on an average additive problem with prime numbers | Marco Cantarini; Alessandro Gambini; Alessandro Zaccagnini |
| 1871 | NA | 2020 | 0 | The Structure and Number of Twin Primes | Mohamed Mansour |
| 1872 | NA | 2020 | 0 | Translating Counting Problems into Computable Language Expressions | Zach Prescott |
| 1873 | NA | 2020 | 0 | Existence, Meaning and the Law of Excluded Middle. A dialogical approach to Hermann Weyl’s philosophical considerations | Zoé McConaughey |
| 1874 | NA | 2020 | 0 | On Waring-Goldbach Problem for Squares, Cubes and Higher Powers | Min Zhang; Jinjiang Li |
| 1875 | NA | 2020 | 0 | The Hardy-Littlewood conjectures on the twin primes and the binary Goldbach problem are true | Maurizio Laporta |
| 1876 | NA | 2020 | 0 | The ternary Goldbach problem with two Piatetski-Shapiro primes and a prime with a missing digit | Helmut Maier; Michael Th. Rassias |
| 1877 | NA | 2020 | 0 | On the conditional bounds for Siegel zeros | Chaohua Jia |
| 1878 | NA | 2020 | 0 | Successive Addition of Digits of an Integer Number: On Properties and Role in Studying Distribution of Primes | Manish Khare; Kalyanlakshmi Chitta |
| 1879 | NA | 2020 | 0 | Some Diophantine equations and inequalities with primes | Roger C. Baker |
| 1880 | NA | 2020 | 0 | Pour un enseignement par la recherche : compte rendu d'un groupe de travail | Didier Lesesvre |
| 1881 | NA | 2020 | 0 | The Complexity of Goldbach's Conjecture | Frank Vega |
| 1882 | NA | 2020 | 0 | Proof of Goldbach's Conjecture | Olvin Dsouza |
| 1883 | NA | 2020 | 0 | An Elementary Proof of Goldbach's Conjecture | Michael Hatfield |
| 1884 | NA | 2020 | 0 | On The Infinitude of Twin Prime Pairs And The Generalized Goldbach's Conjecture | Siddhartha Shree kaushik |
| 1885 | NA | 2020 | 0 | An approach attack to the strong Goldbach's conjecture | Mihoubi, Douadi |
| 1886 | NA | 2020 | 0 | Goldbach's Conjecture | Johan Härdig |
| 1887 | NA | 2020 | 0 | Prime numbers, Goldbach's conjecture, De Polignac's conjecture, Legendre's conjecture, Landau's conjecture, Mersenne's conjecture, and the Fermat number conjecture | Mohamed Sghiar |
| 1888 | NA | 2020 | 0 | Proof of Goldbach's Conjecture | Jaejin Lim |
| 1889 | NA | 2020 | 0 | Goedelian Encryption & Goldbach's Conjecture | Paris Rose Miles-Brenden |
| 1890 | NA | 2020 | 0 | Goldbach's Conjecture — A Route to the Inconsistency of Arithmetic | Ralf Wüsthofen |
| 1891 | NA | 2020 | 0 | Proof of the Twin Primes Conjecture and Goldbach's Conjecture | Pedro Hugo García Peláez |
| 1892 | NA | 2020 | 0 | Prime numbers, Goldbach's conjecture, and De Polignac's conjecture | Mohamed Sghiar |
| 1893 | NA | 2020 | 0 | (VBGC - 2020 latex version in short - 11.02.2020 - 5 A4 pages without references) A "Vertical" Generalization of the binary Goldbach's Conjecture (VBGC) as applied on primes with prime indexes of any order i ("i-primes") (VBGC is a meta-conjecture defined here as a new set/class containing an infinite number of Goldbach-like conjectures stronger than the BGC) | Andrei-Lucian Drăgoi |
| 1894 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1895 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1896 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1897 | NA | 2020 | 0 | An axiom of logic and its effect on Goldbach's binary conjecture | Sitangsu Maitra |
| 1898 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1899 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1900 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1901 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1902 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1903 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1904 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1905 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1906 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1907 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1908 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1909 | NA | 2020 | 0 | The Complexity of Mathematics | Frank Vega |
| 1910 | NA | 2020 | 0 | Godel Diffeomorphisms | Matthew Foreman |
| 1911 | NA | 2020 | 0 | Shannon Meets Turing: Non-Computability and Non-Approximability of the\n Finite State Channel Capacity | Holger Boche; Rafael F. Schaefer; H. Vincent Poor |
| 1912 | NA | 2020 | 0 | Metaphenomenology and the Neuroscience of Consciousness | William Nelson Leonard |
| 1913 | NA | 2019 | 9 | Discorrelation between primes in short intervals and polynomial phases | Kaisa Matomäki; Xuancheng Shao |
| 1914 | NA | 2019 | 5 | Explicit $L^2$ bounds for the Riemann $\zeta$ function | Daniele Dona; H. A. Helfgott; Sebastian Zuniga Alterman |
| 1915 | NA | 2019 | 2 | Waring-Goldbach problem for unlike powers | Zhenzhen Feng; Jing Ma |
| 1916 | NA | 2019 | 2 | Maximally additively reducible subsets of the integers | Gal Gross |
| 1917 | NA | 2019 | 2 | Irreducible Cognitive Phenomenology and the Aha! Experience | John Dorsch |
| 1918 | NA | 2019 | 1 | Proofs of the Twin Primes and Goldbach Conjectures | T. J. Hoskins |
| 1919 | NA | 2019 | 1 | On Proof-Theoretic Approaches to the Paradoxes: Problems of Undergeneration and Overgeneration in the Prawitz-Tennant Analysis | Seungrak Choi |
| 1920 | NA | 2019 | 1 | Waring-Goldbach problem in short intervals | Mengdi Wang |
| 1921 | NA | 2019 | 1 | How to Draw the Right Conclusions: Logical Pluralism without Logical Normativism | Christopher Blake‐Turner |
| 1922 | NA | 2019 | 0 | Discovery on Goldbach conjecture | OLIVIER IDRISS BADO |
| 1923 | NA | 2019 | 0 | The Goldbach Conjecture is True | James Edwin Rock |
| 1924 | NA | 2019 | 0 | Proof of Goldbach Conjecture 2019-01-06 | Michael Grützmann |
| 1925 | NA | 2019 | 0 | Refutation of Inconsistency of Arithmetic Based on Goldbach Conjecture | Colin James |
| 1926 | NA | 2019 | 0 | The Theory of ramification | Theophilus Agama |
| 1927 | NA | 2019 | 0 | Fundamental Errors in Papers | Soerivhe Iriene; J. Oquibo Ihwaiuwaue |
| 1928 | NA | 2019 | 0 | Proof of Riemann Hypothesis and Other Prime Conjectures | Surajit Ghosh |
| 1929 | NA | 2019 | 0 | A Proof of the Twin Primes Conjecture | T. J. Hoskins |
| 1930 | NA | 2019 | 0 | Naturally Numbers Are Three Plus One Dimensional | Surajit Ghosh |
| 1931 | NA | 2019 | 0 | EVERY SUFFICIENTLY LARGE EVEN NUMBER IS THE SUM OF TWO PRIMES | Ricardo Guillermo Barca |
| 1932 | NA | 2019 | 0 | Exceptional autonomous components of Goldbach factorization graphs | A. Bożek |
| 1933 | NA | 2019 | 0 | CONJETURA DE GOLDBACH, NÚMEROS NATURALES Y TEOREMA DE NÚMEROS PRIMOS | Yandry Intriago Delgado |
| 1934 | NA | 2019 | 0 | O-Köşesi Yorumu Nedir ve Geleneksel Karşıtlık Karesini Kurtarabilir mi? | Yavuz Recep Başoğlu |
| 1935 | NA | 2019 | 0 | The area method and applications | Theophilus Agama |
| 1936 | NA | 2019 | 0 | Conjectures mathématiques et antiréalisme chez Wittgenstein | Alexis Morin-Martel |
| 1937 | NA | 2019 | 0 | The ternary Goldbach problem with the Piatetski-Shapiro primes | Shanshan Du; Hao Pan |
| 1938 | NA | 2019 | 0 | Exceptional Set of Waring-Goldbach Problem with Unequal Powers of Primes | Xiaodong Zhao |
| 1939 | NA | 2019 | 0 | About Goldbach's Conjecture | Jérôme Estève; José E. Martínez |
| 1940 | NA | 2019 | 0 | Group-theoretic remarks on Goldbach's conjecture | Liguo He; Xianyu Hu |
| 1941 | NA | 2019 | 0 | Goldbach's Conjecture | Yuji Masuda |
| 1942 | NA | 2019 | 0 | Proof of Goldbach's Conjecture | Wu Ye TangYin |
| 1943 | NA | 2019 | 0 | Algorithm Capable of Proving Goldbach's Conjecture- An Unconventional Approach | Elizabeth Gatton-Robey |
| 1944 | NA | 2019 | 0 | Goldbach's conjecture, where we find $\\zeta$ in another way | Denise Vella-Chemla |
| 1945 | NA | 2019 | 0 | Mirror Sieves :Goldbach vs Matiyasevich | Francis Maleval |
| 1946 | NA | 2019 | 0 | Goldbach's like conjectures arising from arithmetic progressions whose first two terms are primes | Romeo Meštrović |
| 1947 | NA | 2019 | 0 | Proof of Landau’s Fourth Problem | Stephen Marshall |
| 1948 | NA | 2019 | 0 | Apriority, Super-Rigidity, and Fregean Content | Robert Smithson |
| 1949 | NA | 2018 | 15 | Improved ℓp -Boundedness for Integral k -Spherical Maximal Functions | Theresa C. Anderson; Brian Cook; Kevin Hughes; Angel Kumchev |
| 1950 | NA | 2018 | 9 | Evolution and Moral Disagreement | Michael Klenk |
| 1951 | NA | 2018 | 8 | L'arithméticien Édouard Lucas (1842–1891) : théorie et instrumentation | Anne-Marie Décaillot |
| 1952 | NA | 2018 | 7 | PRIME SOLUTIONS TO POLYNOMIAL EQUATIONS IN MANY VARIABLES AND DIFFERING DEGREES | Shuntaro Yamagishi |
| 1953 | NA | 2018 | 3 | On the Chowla and twin primes conjectures over $\mathbb F_q[T]$ | Will Sawin; Mark Shusterman |
| 1954 | NA | 2018 | 2 | Definitive Proof of Goldbach's conjecture | Kenneth A. Watanabe |
| 1955 | NA | 2018 | 1 | Demonstration of Goldbach Conjecture | Idriss Olivier Bado |
| 1956 | NA | 2018 | 1 | On Some Conjectures in Additive Number Theory | Huixi Li |
| 1957 | NA | 2018 | 1 | Prime Numbers–Why are They So Exciting? | Ehud de Shalit |
| 1958 | NA | 2018 | 1 | Technological Applications of the Grand Unified Theory | E. E. Escultura |
| 1959 | NA | 2018 | 0 | GOLDBACH CONJECTURE PROOF | OLIVIER IDRISS BADO |
| 1960 | NA | 2018 | 0 | New Discovery on Goldbach Conjecture | Bado idriss olivier |
| 1961 | NA | 2018 | 0 | The Mathematical Modeling and Proof of the Goldbach Conjecture | Yu Wang |
| 1962 | NA | 2018 | 0 | Proof of Stronger Goldbach Conjecture | Wildan Waleed Mahmood |
| 1963 | NA | 2018 | 0 | Proof of the Goldbach Conjecture | Zhuwenhao |
| 1964 | NA | 2018 | 0 | A New Proof of the Strong Goldbach Conjecture | Es-said En-naoui |
| 1965 | NA | 2018 | 0 | The Strong Goldbach Conjecture, Klein Bottle And Möbius Strip | Angel Garcés Doz |
| 1966 | NA | 2018 | 0 | The Goldbach Conjecture | Ricardo Guillermo Barca |
| 1967 | NA | 2018 | 0 | New Discovery On Goldbach Conjecture | Idriss Olivier Bado |
| 1968 | NA | 2018 | 0 | A Remark on the Strong Goldbach Conjecture | Theophilus Agama |
| 1969 | NA | 2018 | 0 | A consequence of the negation of Strong Goldbach Conjecture | Aribam Uttam Sharma |
| 1970 | NA | 2018 | 0 | Proof of Goldbach Conjecture for the Integer System | Kim Geon Hack |
| 1971 | NA | 2018 | 0 | Updated Elementary Proof of the Goldbach Conjecture | Stephen Marshall |
| 1972 | NA | 2018 | 0 | An elementary conjecture which implies the Goldbach conjecture | Richard A. Williamson |
| 1973 | NA | 2018 | 0 | The Mathematical Model of the Natural Evolution Law of Cosmic Material Organisms | Sai Chuen Hui |
| 1974 | NA | 2018 | 0 | Goldbach Pereyra Theorem | Pablo Hernan Pereyra |
| 1975 | NA | 2018 | 0 | Goldbach-Conjecture - is Anti-Cooper Non-Sc GapFUL Fermion/PAIR-BREAKING Sc-To Phase-Transition Critical-Phenomenon Primes N-BEC-Factorization/DEncryption-Cyber-THREATS(IBM/BlockChain) Are MANDATORY!!! | Edward Carl-Ludwig Siegel; Gian‐Carlo Rota; Jules Henri Poincare; Frederic Young |
| 1976 | NA | 2018 | 0 | Goldbach-Conjecture NUMBER(#)-THEORY) is Anti-Cooper Non-Sc GapFUL Fermion/PAIR-BREAKING Sc-To Phase-Transition Critical-Phenomenon Primes N-BEC-Factorization/DEncryption-Cyber-THREATS(IBM/BlockChain) Are MANDATORY!!! | Edward Carl-Ludwig Siegel; Gian‐Carlo Rota; Jules Henri Poincare; Frederic Young |
| 1977 | NA | 2018 | 0 | Sieve Method: Sieve the Forward and Reverse In One Time | Sai Chuen Hui |
| 1978 | NA | 2018 | 0 | GOLDBACH-CONJECTURE-(IN NUMBER(#)-THEORY) IS ANTI-COOPER-PAIRING(IN NON-SC) GapFUL Fermion/PAIR-BREAKING SC-TO-NORMAL PHASE-TRANSITION CRITICAL-PHENOMENON: Primes N-BEC-Factorization/DEncryption-Cyber-THREATS(IBM/BlockChain) Are MANDATORY!!! | Edward Carl-Ludwig Siegel; Gian‐Carlo Rota; Jules Henri Poincare; Frederic Young |
| 1979 | NA | 2018 | 0 | Goldbach and Twin Prime Pairs: A Sieve Method to Connect the Two | Tom Milner-Gulland |
| 1980 | NA | 2018 | 0 | Complementary Inferences on Theoretical Physics and Mathematics | Mesut Kavak |
| 1981 | NA | 2018 | 0 | Une méthode nouvelle autour de la conjecture abc | Junior Mukomene; Mukomene Mvula |
| 1982 | NA | 2018 | 0 | NÚMEROS PRIMOS; MÉTODO GRÁFICO DE LA CONJETURA DE GOLDBACH | Yandry Intriago Delgado |
| 1983 | NA | 2018 | 0 | The Prime Classification and Factor Structure | Xing Xue; Jinggang Zhang |
| 1984 | NA | 2018 | 0 | Atoms in Quasilocal Integral Domains | D. D. Anderson; Kevin W. Bombardier |
| 1985 | NA | 2018 | 0 | On the Waring-Goldbach problem on average | Alessandro Languasco |
| 1986 | NA | 2018 | 0 | Waring-Goldbach Problem: Two Squares and Three Biquadrates | Yingchun Cai; Li Zhu |
| 1987 | NA | 2018 | 0 | Topics in Multiplicative Number Theory | Joni Teräväinen |
| 1988 | NA | 2018 | 0 | A Diophantine inequality with four prime variables | Min Zhang; Jinjiang Li |
| 1989 | NA | 2018 | 0 | Goldbach's Conjectures | Radomir Majkic |
| 1990 | NA | 2018 | 0 | Goldbach's Conjecture | Toshiro Takami |
| 1991 | NA | 2018 | 0 | A proposition for a Goldbach's conjecture demonstration | Denise Vella-Chemla |
| 1992 | NA | 2018 | 0 | Goldbach's Conjecture Ver.2 | Toshiro Takami |
| 1993 | NA | 2018 | 0 | A Note on Dirichlet's Theorem and GoldBach's Conjecture Proof v2 | Raúl A. R. C. Sousa |
| 1994 | NA | 2018 | 0 | Proof of the Goldbach's Conjecture | Andrey B. Skrypnik |
| 1995 | NA | 2018 | 0 | Solution of Goldbach's Conjecture | Ryujin Choe |
| 1996 | NA | 2018 | 0 | The Proof of Goldbach's Conjecture | Matan Cohen |
| 1997 | NA | 2018 | 0 | The complete proof of Goldbach's Conjecture | Matan Cohen |
| 1998 | NA | 2018 | 0 | Proof of the Goldbach's Conjecture (Russian Version) | Andrey B. Skrypnik |
| 1999 | NA | 2018 | 0 | Goldbach's Conjecture, chip-firing game, 2 × 2 matrices and infinite descent | Denise Vella-Chemla |
| 2000 | NA | 2018 | 0 | Goldbach’s Conjecture Proof | Elizabeth Gatton-Robey |
| 2001 | NA | 2018 | 0 | On the Infiltration of Ideological and Moral Education in Primary Mathematics Teaching | Qin Wang; JiangJing Xia |
| 2002 | NA | 2018 | 0 | On a new extension of the zero-divisor graph | A. Cherrabi; H. Essannouni; E. Jabbouri; A. Ouadfel |
| 2003 | NA | 2018 | 0 | Conceiving as Evidence of Possibility | Benjamin Faltesek |
| 2004 | NA | 2018 | 0 | Theory Of Kósmos (Kt) - Genesis Of Life - | Stephan Opielok |
| 2005 | NA | 2018 | 0 | Hume on Thick and Thin Causation | Alexander Bozzo |