The congruent number problem

被引:0
|
作者
V. Chandrasekar
机构
[1] C/o Mr Sripathy Spic Mathematics Institute,
来源
Resonance | 1998年 / 3卷 / 8期
关键词
Fermat; Rational Number; Modular Form; Elliptic Curve; Elliptic Curf;
D O I
10.1007/BF02837344
中图分类号
学科分类号
摘要
In Mathematics, especially number theory, one often comes across problems which arise naturally and are easy to pose, but whose solutions require very sophisticated methods. What is known as ‘The Congruent Number Problem’ is one such. Its statement is very simple and the problem dates back to antiquity, but it was only recently that a breakthrough was made, thanks to current developments in the Arithmetic of elliptic curves, an area of intense research in number theory.
引用
收藏
页码:33 / 45
页数:12
相关论文
共 50 条
  • [41] The even parity Goldfeld conjecture: Congruent number elliptic curves
    Burungale, Ashay
    Tian, Ye
    JOURNAL OF NUMBER THEORY, 2022, 230 : 161 - 195
  • [42] A note on the congruent distribution of the number of prime factors of natural numbers
    Kubota, T
    Yoshida, M
    NAGOYA MATHEMATICAL JOURNAL, 2001, 163 : 1 - 11
  • [43] A graphical approach to computing Selmer groups of congruent number curves
    Bryan Faulkner
    Kevin James
    The Ramanujan Journal, 2007, 14 : 107 - 129
  • [44] The Problem of This Number
    Hanks, L. M., Jr.
    JOURNAL OF SOCIAL ISSUES, 1947, 3 (04) : 2 - 5
  • [45] The θ-Congruent Number Elliptic Curves via Fermat-type Algorithms
    Salami, Sajad
    Zargar, Arman Shamsi
    BULLETIN OF THE BRAZILIAN MATHEMATICAL SOCIETY, 2021, 52 (04): : 893 - 908
  • [46] ON A NONCRITICAL SYMMETRIC SQUARE L-VALUE OF THE CONGRUENT NUMBER ELLIPTIC CURVES
    Samart, Detchat
    BULLETIN OF THE AUSTRALIAN MATHEMATICAL SOCIETY, 2020, 101 (01) : 13 - 22
  • [47] ON HIGH RANK π/3 AND 2π/3-CONGRUENT NUMBER ELLIPTIC CURVES
    Janfada, A. S.
    Salami, S.
    Dujella, A.
    Peral, J. C.
    ROCKY MOUNTAIN JOURNAL OF MATHEMATICS, 2014, 44 (06) : 1867 - 1880
  • [48] On the Number of Congruent Classes of the Tetrahedra Determined by Given Volume, Circumradius and Face Areas
    Zeng, Zhenbing
    Yang, Lu
    Dehbi, Lydia
    PROCEEDINGS OF THE 2019 ACM INTERNATIONAL SYMPOSIUM ON SYMBOLIC AND ALGEBRAIC COMPUTATION (ISSAC '19), 2019, : 363 - 370
  • [49] Covering a convex 3D polytope by a minimal number of congruent spheres
    Stoyan, Yu. G.
    Patsuk, V. M.
    INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2014, 91 (09) : 2010 - 2020
  • [50] CLASS NUMBER PROBLEM
    RYDEN, RW
    AMERICAN MATHEMATICAL MONTHLY, 1979, 86 (03): : 200 - 202
12345