Modulo p representations of reductive p-adic groups: functorial properties

Abstract

Let F be a local field with residue characteristic p, let C be an algebraically closed field of characteristic p, and let G be a connected reductive F-group. In a previous paper, Florian Herzig and the authors classified irreducible admissible C-representations of G=G(F) in terms of supercuspidal representations of Levi subgroups of G. Here, for a parabolic subgroup P of G with Levi subgroup M and an irreducible admissible C-representation τ of M, we determine the lattice of subrepresentations of IndPG τ and we show that IndPG τ is irreducible for a general unramified character of M. In the reverse direction, we compute the image by the two adjoints of IndPG of an irreducible admissible representation π of G. On the way, we prove that the right adjoint of IndPG respects admissibility, hence coincides with Emerton's ordinary part functor OrdPG on admissible representations.