摘 要:
Motivic cohomology, originated from Deligne, Beilinson and Lichtenbaum and developed by Voevodsky, is a kind of cohomology theory on schemes. It admits comparison with étale cohomology of powers of roots of unity (Beilinson-Lichtenbaum), together with higher Chow groups, and relates to K-theory by Atiyah-Hirzebruch spectral sequence. In this lecture, we establish the category of motives in which the motivic cohomologies are realized. We explain its relationship with Milnor K-theory and Chow group. Furthermore, we introduce devices like MV-sequence, Gysin triangle, projective bundle formula and duality.
预备知识:
Basic algebraic geometry (GTM 52, Chapter 1-3)
参考书目:
C. Mazza, V. Voevodsky, C. Weibel, Lecture Notes on Motivic Cohomology, American Mathematical Society, Providence, RI, for the Clay Mathematics Institute, Cambridge, MA (2006).
主讲人简介:
本人本科毕业于北京航空航天大学,硕士博士毕业于格勒诺布尔-阿尔卑斯大学,博士导师Jean Fasel。之后在丘成桐数学科学中心做博后,现在是BIMSA的助理研究员。本人研究方向为原相(motivic)上同调和周-威特(Chow-Witt)环。本人提出了分裂型米尔诺-威特原相理论并且应用在纤维丛的周-威特环的计算中。相关成果已经独立发表在Manus. Math.和Doc. Math.等期刊上。
Note link:
Video link:
(Passcode: 508!pfJL)
(Passcode: W.p?p3@j)
(Passcode: O0A#NuE$)
(Passcode: A0Js.uaU)
(Passcode: X9kFtwx@)
(Passcode: 0Feiyif%)
(Passcode: L02GL=1?)
(Passcode: Y#B0^Sf4)
(Passcode: 6sYf!kFe)
(Passcode: 0Fi#5*@L)
(Passcode: 6V!Nz75c)
(Passcode: @7!*J?Ut)
(Passcode: F#^%6@%6)
(Passcode: r0Yi2gw$)
(Passcode: QnrL47*a)
(Passcode: ^1ZRdrgf)
(Passcode: EMLFm17+)
(Passcode: @j0m*.9k)
(Passcode: aDQ@5p!w)
(Passcode: [email protected])
(Passcode: 2&b33u7u)
(Passcode: %8L5DhtY)
