On the constituents of the mod p cohomology of Shimura curves

Abstract

Let p be a prime number and K a finite unramified extension of Qp. When p is large enough with respect to [K:Qp] and under mild genericity assumptions, we proved in our previous work that the admissible smooth representations π of GL2(K) that occur in Hecke eigenspaces of the mod p cohomology are of finite length. In this paper we obtain various refined results about the structure of subquotients of π, such as their Iwahori-socle filtrations and K1-invariants, where K1 is the principal congruence subgroup of GL2(OK). We also determine the Hilbert series of π as Iwahori-representation under these conditions.