Project Details
Projekt
The arithmetic of period domains and local shtuka (C 05)
Subject Area
Mathematics
Term
from 2007 to 2009
Project identifier
Deutsche Forschungsgemeinschaft (DFG) - Project number 5482091
Local shtuka are the analogue in equal positive characteristic of Barsotti-Tate groups. Both possess rigid analytic period domains and moduli spaces, which map to the corresponding period domains by étale period morphisms. In this project we extend the existing theory for local shtuka to the semistable case and to general reductive groups. We investigate the cohomology of their period domains, the image of the period morphisms both in equal and mixed characteristic, and the relation with a p-adic local Langlands correspondence.
DFG Programme
Collaborative Research Centres
Subproject of
SFB 478:
Geometric structures in mathematics
Applicant Institution
Universität Münster
Project Head
Professor Dr. Urs Hartl
