On the mod p cohomology for GL2: the non-semisimple case

Abstract

Let F be a totally real field unramified at all places above p and D be a quaternion algebra which splits at either none, or exactly one, of the infinite places. Let r:Gal(F/F) GL2(Fp) be a continuous irreducible representation which, when restricted to a fixed place v|p, is non-semisimple and sufficiently generic. Under some mild assumptions, we prove that the admissible smooth representations of GL2(Fv) occurring in the corresponding Hecke eigenspaces of the mod p cohomology of Shimura varieties associated to D have Gelfand-Kirillov dimension [Fv:Qp]. We also prove that any such representation can be generated as a GL2(Fv)-representation by its subspace of invariants under the first principal congruence subgroup. If moreover [Fv:Qp]=2, we prove that such representations have length 3, confirming a speculation of Breuil and Pask\=unas.