V
主页
Alexander Efimov, Dualizable categories and localizing motives, Part II
发布人
https://archive.mpim-bonn.mpg.de/id/eprint/5092/ Workshop on Dualisable Categories & Continuous K-theory. Abstract of workshop: Algebraic K-theory is an object that sits at the centre of large parts of algebra, geometry, and topology because of its universal role as a receptacle to count other mathematical objects with signs. However, since its invention, a phenomenon often called the Eilenberg swindle - which says that the algebraic K-theory of a category which is too large must necessarily be zero - has been accepted as a fundamental limit to the theory. Recently, Alexander Efimov introduced a construction called continuous K-theory which allows one to make sense of algebraic K-theory of certain large categories known as dualisable categories in a nontrivial way, thus surmounting the problem of the aforementioned Eilenberg swindle. These dualisable categories encompass geometrically interesting and previously inaccessible examples such as sheaves on locally compact Hausdorff spaces. This new direction in K-theory has seen many recent advancements such as the rigidity of non-commutative motives by Efimov and the polynomial functoriality of continuous K-theory by Akhil Mathew and collaborators. In light of these developments, this workshop aims to bring the community of mathematicians in algebra, topology, and geometry up to speed on the latest results and perspectives spawned by the theory of dualisable categories and continuous K-theory. The workshop will consist of two main lecture series by Alexander Efimov and Akhil Mathew, augmented by multiple exercise sessions, which we hope will allow for the participants to obtain a working knowledge on the subject. There will also be research talks as well as a session of short contributed talks by participants.
打开封面
下载高清视频
观看高清视频
视频下载器
Alexander Efimov, Dualizable categories and localizing motives, Part III
Akhil Mathew, Introduction to dualisable categories and their K-theory, Part I
Tasos Moulinos (Paris): Betti realizations of noncommutative motives
Alexander Goncharov - Exponential Volumes in Geometry and Representation Theory
陶辞讲解道德经 B站最完整版100讲 《帛书老子》--读懂原本道德经!!!!
Don Zagier - Modular Forms and Differential Equations
RLChina 2024 | 3小时强化学习入门课程-上
Akhil Mathew, Introduction to dualizable categories and their K-theory V
部优 21课 连云港王艳雨 让我们共同感受历史
戴锦华北大讲座:未来的维度
Mingjia Zhang: Intersection cohomology of Shimura varieties
Naoki Imai: The syntomic realization functor for Shimura varieties
【性教育·系列】男女性教育知识讲座系列丨全网最全
批判性思维陈君华-中国讲逻辑最好的老师
Claude Sabbah - Vanishing Theorems for the Irregular Hodge Filtration
Yves André - Motives and representation theory: principles and case studies
南开大学《孙子兵法》详解 艾跃进 22集全
Juan Esteban Rodriguez Camargo: Analytic prismatization over Z_p, I
Juan Esteban Rodriguez Camargo: geometric sen theory II
Takuro Mochizuki - Some Applications of Non-Abelian Hodge Theory
Juan Esteban Rodriguez Camargo: Analytic prismatization over Z_p, IV
最新《一个粗瓷大碗》公开课优质课【新课标小学语文三年级上册】
Vadim Vologodsky: Sheared prismatization
Vanishing of Selmer Groups for Siegel Modular Forms - Sam Mundy
Eike Lau: Truncated Barsotti-Tate groups and truncated displays II
Vasudevan- Finiteness Questions for Étale Coverings with Bdd Wild Ramification
2025届高三物理步步高第一轮复习88练第九章第3练(中)
Mikhail Kapranov - Perverse Sheaves and Resurgence
戴锦华《未来的维度:人文、科幻与今日世界》(北京大学 )
姐姐今天讲SQL语法中的Order By和怎么使用And/Or |《SQL》第2节
Mod-p Poincare Duality in p-adic Analytic Geometry - Bogdan Zavyalov
Shachar Carmeli: The K-theory of non-split tori
Juan Esteban Rodriguez Camargo: Analytic prismatization over Z_p, III
哈哈哈哈,终于让我搞出来了,comsol多孔介质-气固化学反应
张至顺道长《金刚长寿功》DVD高清版
Alexander Efimov: Commutation of K-theory with certain inverse limits
Birgit Richter (Hamburg): Loday Constructions of Tambara functors
Juan Esteban Rodriguez Camargo: Analytic prismatization over Z_p, part II
理解规律就是数学,就明白物理和数学的关系了。
Michael A. Hill (Los Angeles): Generalized slice filtrations
