Factorization de la cohomologie \'etale p-adique de la tour de Drinfeld

Abstract

For a finite extension F of Qp, Drinfeld defined a tower of coverings of P1 P1(F) (the Drinfeld half-plane). For F = Qp, we describe a decomposition of the p-adic geometric \'etale cohomology of this tower analogous to Emerton's decomposition of completed cohomology of the tower of modular curves. A crucial ingredient is a finitness theorem for the arithmetic \'etale cohomology modulo p which is shown by first proving, via a computation of nearby cycles, that this cohomology has finite presentation. This last result holds for all F; for F≠ Qp, it implies that the representations of GL2(F) obtained from the cohomology of the Drinfeld tower are not admissible contrary to the case F = Qp.