拉马努金丢失的笔记本

拉马努金丢失的笔记本
Ramanujan's lost notebook

原始链接: https://en.wikipedia.org/wiki/Ramanujan%27s_lost_notebook

斯里尼瓦萨·拉马努金 (Srinivasa Ramanujan) 留下了一系列开创性的数学发现，记录在 1976 年发现的一本笔记本中。这份手稿由一百多页、六百多个数学公式组成，在 1920 年拉马努金去世后失踪。它在剑桥大学的实验室中被重新发现。乔治·安德鲁斯 (George Andrews) 的三一学院图书馆，他随后花了数年时间通过与布鲁斯·伯恩特 (Bruce Berndt) 的合作出版物来证明这些公式。这本“丢失的笔记本”的重要性在数学界引起了相当大的兴奋，将其影响与贝多芬第十交响曲的发现相比。在它被发现之前，拉马努金的一些论文被交给了马德拉斯大学，但最终又回到了英国，直到 1976 年安德鲁斯访问雷恩图书馆为止，这些论文一直未被发现。笔记本中值得注意的发现包括模拟θ 函数，已被证明有助于计算黑洞的熵。

该用户表达了他们希望出版 Ramanujan 的数学著作，并将其与 Linux 等自由开源软件 (FOSS) 进行比较。他们提到了拉马诺金独特的笔迹，并欣赏陶哲轩等专家的潜在见解。用户在拉马努金的作品中找到灵感，特别是回想起通过梦或神圣干预而变得可以理解的困难数学的例子。他们推荐布鲁斯·伯恩特 (Bruse Berndt) 和 G.H.哈迪 (G.H.Hardy) 讨论拉马努金工作的书籍。该用户还承认在理解高等数学方面存在一些挑战，并对他们之前的言论造成的任何混乱表示歉意。他们分享通过梦想和直觉解决问题的个人经验。尽管对西方无神论提出批评，但该用户强调了在科学追求中相信世界的合理性和可理解性的重要性，并将其比作泛神论的观点。用户最后讨论了系统管理员的完美性，他们将其与斯宾诺莎的上帝概念联系起来。该用户表示，围绕智力本质、发现过程以及信仰在数学中的作用的讨论仍然是有趣的话题。

原文

Collection of Srinivasa Ramanujan's discoveries in mathematics

Ramanujan's lost notebook is the manuscript in which the Indian mathematician Srinivasa Ramanujan recorded the mathematical discoveries of the last year (1919–1920) of his life. Its whereabouts were unknown to all but a few mathematicians until it was rediscovered by George Andrews in 1976, in a box of effects of G. N. Watson stored at the Wren Library at Trinity College, Cambridge. The "notebook" is not a book, but consists of loose and unordered sheets of paper described as "more than one hundred pages written on 138 sides in Ramanujan's distinctive handwriting. The sheets contained over six hundred mathematical formulas listed consecutively without proofs."^[1]

George Andrews and Bruce C. Berndt (2005, 2009, 2012, 2013, 2018) have published several books in which they give proofs for Ramanujan's formulas included in the notebook. Berndt says of the notebook's discovery: "The discovery of this 'Lost Notebook' caused roughly as much stir in the mathematical world as the discovery of Beethoven’s tenth symphony would cause in the musical world."^[2]

History[edit]

After Ramanujan died on April 26, 1920, at the age of 32, his wife gave his notebooks to the University of Madras. On August 30, 1923, the registrar Francis Drewsbury sent much of this material to G. H. Hardy, Ramanujan's mentor at Trinity College, where he probably received the manuscripts of the lost notebook.

... Almost surely, this manuscript, or at least most of it, was written during the last year of Ramanujan's life, after his return to India from England. ... The manuscript contains no introduction or covering letter. In fact, there are hardly any words in the manuscript. There are a few marks evidently made by a cataloguer, and there are a few remarks in the handwriting of G. H. Hardy. Undoubtedly, the most famous objects examined in the lost notebook are the mock theta functions ...^[1]

Some time between 1934 and 1947, Hardy probably passed the notebook on to G. N. Watson, who with B. M. Wilson started on the project of editing Ramanujan's notebooks. However, Wilson died in 1935 and Watson seems to have lost interest in the project in the late 1930s.^[3] After Watson's death in 1965, J. M. Whittaker examined Watson's papers (which were in disarray, due to be incinerated in a few days) and found Ramanujan's notebook, which he and R. A. Rankin sent to Trinity College Wren library on December 26, 1968. George Andrews (1986, section 1.5), following a suggestion by Lucy Slater, found the lost notebook in the spring of 1976 while on a visit to Trinity College. It was published on December 22, 1987, by Narosa publishing house.

Andrews' account of the discovery[edit]

George Andrews, an American mathematician, wrote in 2012 an account of the discovery for the 125th celebration of Ramanujan's birth.^[4] In his account, Andrews states that he was already an advanced researcher in fields, such as mock theta functions and hypergeometric series, related closely to works of Ramanujan. In 1970, anticipating a sabbatical, he wrote to British mathematician Lucy Slater. Slater "intriguingly" stated in her reply that she had inherited a "great collection" of papers from mathematicians such as Watson, Bailey, Jackson and Rogers, which were unsorted, including one of the last by Ramanujan. She also mentioned other papers were held by the Trinity College library.

Although unable to travel to Europe in 1970, Andrews became able to do so in 1976, when he was due to attend a European conference in Strasbourg, near the Franco-German border. He obtained permission and support from Slater, from the Trinity College library, and from his professor, Ben Noble, to visit Cambridge after the conference, in order to investigate the "invaluable" unpublished writings of Watson et al. Noble agreed, adding that if he could attempt to find a lost paper by James Clerk Maxwell at the same time, it would be appreciated. The library's documents included a list of matters held from Watson's estate. The list included the item: "A 139 page manuscript by S. Ramanujan on q-series", containing the work from Ramanujan's final year.

Although not labelled as such, the identity of the papers was settled because Ramanujan's final letters to Hardy had referred to the discovery of what Ramanujan called mock theta functions, although without great detail, and the manuscript included what appeared to be his full notes on these.

Contents[edit]

Rankin (1989) described the lost notebook in detail. The majority of the formulas are about q-series and mock theta functions, about a third are about modular equations and singular moduli, and the remaining formulas are mainly about integrals, Dirichlet series, congruences, and asymptotics. The mock theta functions in the notebook have been found to be useful for calculating the entropy of black holes.^[5]

References[edit]

Bibliography[edit]

Alladi, Krishnaswami (17 February 2005), "Ramanujan's lost notebook: a lecture series in Florida", The Hindu, archived from the original on March 3, 2007{{citation}}: CS1 maint: unfit URL (link)
Andrews, George E. (1986), q-series: their development and application in analysis, number theory, combinatorics, physics, and computer algebra, CBMS Regional Conference Series in Mathematics, vol. 66, Published for the Conference Board of the Mathematical Sciences, Washington, DC, ISBN 978-0-8218-0716-3, MR 0858826
Andrews, George E.; Berndt, Bruce C. (2005), Ramanujan's lost notebook. Part I, Berlin, New York: Springer-Verlag, ISBN 978-0-387-25529-3, MR 2135178, OCLC 228396300
Andrews, George E.; Berndt, Bruce C. (2009), Ramanujan's lost notebook. Part II, Berlin, New York: Springer-Verlag, ISBN 978-0-387-77765-8, MR 2474043
Andrews, George E.; Berndt, Bruce C. (2012), Ramanujan's lost notebook. Part III, Berlin, New York: Springer-Verlag, ISBN 978-1-4614-3809-0
Andrews, George E.; Berndt, Bruce C. (2013), Ramanujan's lost notebook. Part IV, Berlin, New York: Springer-Verlag, ISBN 978-1-4614-4080-2
Andrews, George E.; Berndt, Bruce C. (2018), Ramanujan's lost notebook. Part V, Berlin, New York: Springer-Verlag, ISBN 978-3-319-77834-1
Askey, Richard (1988), "Book Review: The lost notebook and other unpublished papers", Bulletin of the American Mathematical Society, New Series, 19 (2): 558–560, doi:10.1090/S0273-0979-1988-15741-2, ISSN 0002-9904, MR 1567721
Peterson, Doug (2006), "Raiders of the Lost Notebook", LASNews, archived from the original on 2018-08-09, retrieved 2009-02-19
Ramanujan, Srinivasa (1988), The lost notebook and other unpublished papers, New Delhi; Berlin, New York: Narosa Publishing House; Springer-Verlag, ISBN 978-3-540-18726-4, MR 0947735 Reprinted 2008 ISBN 978-81-7319-947-9
Rankin, Robert A. (1989), "Ramanujan's manuscripts and notebooks. II", Bull. London Math. Soc., 21 (4): 351–365, doi:10.1112/blms/21.4.351, ISSN 0024-6093, MR 0998632