Author:
Colmez Pierre,Dospinescu Gabriel,Nizioł Wiesława
Abstract
Résumé
For a finite extension F of
${\mathbf Q}_p$
, Drinfeld defined a tower of coverings of
(the Drinfeld half-plane). For
$F = {\mathbf Q}_p$
, we describe a decomposition of the p-adic geometric étale cohomology of this tower analogous to Emerton’s decomposition of completed cohomology of the tower of modular curves. A crucial ingredient is a finiteness theorem for the arithmetic étale cohomology modulo p whose proof uses Scholze’s functor, global ingredients, and a computation of nearby cycles which makes it possible to prove that this cohomology has finite presentation. This last result holds for all F; for
$F\neq {\mathbf Q}_p$
, it implies that the representations of
$\mathrm{GL}_2(F)$
obtained from the cohomology of the Drinfeld tower are not admissible contrary to the case
$F = {\mathbf Q}_p$
.
Publisher
Cambridge University Press (CUP)
Subject
Discrete Mathematics and Combinatorics,Geometry and Topology,Mathematical Physics,Statistics and Probability,Algebra and Number Theory,Analysis
Reference71 articles.
1. Représentations de
${\mathrm{GL}}_2\left({\mathbf{Q}}_p\right)$
et
$\left(\varphi, \varGamma \right)$
-modules;Colmez;Astérisque,2010
2. On the $\operatorname{mod}p$ cohomology for $\mathrm{GL}_2$: the non-semisimple case
3. Cohomology of p-adic Stein spaces
4. Familles de représentations de de Rham et monodromie
$p$
-adique;Berger;Astérisque,2008
5. Cohomologie des courbes analytiques $p$-adiques
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