Explicit $mod-\ell$ categorical local Langlands correspondence for depth-zero supercuspidal part of $GL_2$
发布时间:2023年09月04日
浏览次数:2023
发布者: Yiyi Ye
主讲人: Chenji Fu(University of Bonn)
活动时间: 从 2023-09-13 14:00 到 15:00
场地: Room 77201, Jingchunyuan 78, BICMR
Abstract:
Let F be a non-archimedean local field. I will explicitly describe:4
(1) (The category of quasicoherent sheaves on) The connected component of the moduli space of Langlands parameters over Z_l-bar containing an irreducible tame L-parameter with $F_l-bar$ coefficients;(2) the block of the category of smooth representations of $G(F)$ with $Z_l-bar$ coefficients containing a depth-zero supercuspidal representation with $F_l-bar$ coefficients.
The argument works at least for (simply connected) split reductive group $G$, but I will focus on the example of $GL_2$ for simplicity. The two sides turn out to match abstractly. If time permits, I will explain how to get the categorical local Langlands correspondence for depth-zero supercuspidal part of $GL_2$ with $Z_l-bar$ coefficients in Fargues-Scholze's form.