时间:2025年3月21日(星期五)16:45-17:45
地点:E4-233
主讲人: 理论科学研究院 赵以庚
讲座主题:Cohomological approach to geometric ramification theory
讲座摘要:
For a constructible étale sheaf on a variety of positive characteristic p, there are two globally defined invariants: Euler-Poincaré characteristic and epsilon factor, which appear in the functional equation of its Grothendieck L-function. We study their relationships with locally defined ramification invariants of the sheaf in geometric ramification theory. Those local invariants are usually treated as numbers or 0-cycles, while we show they share nice functorial properties as cohomological classes in this talk. As applications, we confirm Kato-Saito's conjecture on the twist formula for epsilon factors and the quasi-projective case of Saito's conjecture on characteristic classes.
