On the pro-\'etale cohomology of quotient stacks of Drinfeld spaces
Abstract
Let Hn-1K denote the (n-1)-dimensional Drinfeld space over a p-adic field K. We give an explicit description of the -adic and p-adic pro-\'etale cohomology of quotient stacks [Hn-1K/GLn(OK)] and [Hn-1K/GLn(K)], which are moduli stacks of special formal OD-modules. The computation makes use of the isomorphism between the Lubin-Tate tower and the Drinfeld tower due to Faltings and Scholze--Weinstein, as well as the p-adic pro-\'etale cohomology of the Drinfeld spaces computed by Colmez--Dospinescu--Niziol. As an application, we also compute the continuous group cohomology of GLn(Qp) over duals of generalized Steinberg representations over Qp.
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