>>707
>いくらうんちく語っても初歩問題ひとつ解けなきゃ無意味ですよ

下記 Langlands program Geometric conjectures
”a 9-person collaborative project”ねぇ〜w
9人いれば 野球チームだよ おいおいw (^^

9人いれば 分業できる
”おれの専門は幾何だ”という人がいるとします
そうすると
”ある代数の初歩問題がひとつ解けなくとも”OKかもよ
専門が違えば 初歩問題が解けないとしても
9人のうち 何人かが解ければ いい
解けない人が数人いても 9人のチームで解ければ 無問題 (^^;
そういう時代じゃないですか?w

https://en.wikipedia.org/wiki/Langlands_program
Langlands program
Geometric conjectures
Main article: Geometric Langlands correspondence
In 2024, a 9-person collaborative project led by Dennis Gaitsgory announced a proof of the (categorical, unramified) geometric Langlands conjecture leveraging Hecke eigensheaves as part of the proof.[3][4][5][6]

https://en.wikipedia.org/wiki/Geometric_Langlands_correspondence
Geometric Langlands correspondence
A claimed proof of the categorical unramified geometric Langlands conjecture was announced on May 6, 2024 by a team of mathematicians including Dennis Gaitsgory.[7][8] The claimed proof is contained in more than 1,000 pages across five papers and has been called "so complex that almost no one can explain it". Even conveying the significance of the result to other mathematicians was described as "very hard, almost impossible" by Drinfeld.[9]

Connection to physics
In a paper from 2007, Anton Kapustin and Edward Witten described a connection between the geometric Langlands correspondence and S-duality, a property of certain quantum field theories.[10]

In 2018, when accepting the Abel Prize, Langlands delivered a paper reformulating the geometric program using tools similar to his original Langlands correspondence.[11][12] Langlands' ideas were further developed by Etingof, Frenkel, and Kazhdan.[13]