On special representations of p-adic reductive groups

Abstract

Let F be a non-Archimedean locally compact field, let G be a split connected reductive group over F. For a parabolic subgroup Q⊂ G and a ring L we consider the G-representation on the L-module(*) C∞(G/Q,L)/ΣQ'⊃neq QC∞(G/Q',L).Let I⊂ G denote an Iwahori subgroup. We define a certain free finite rank L-module M (depending on Q; if Q is a Borel subgroup then (*) is the Steinberg representation and M is of rank one) and construct an I-equivariant embedding of (*) into C∞(I, M). This allows the computation of the I-invariants in (*). We then prove that if L is a field with characteristic equal to the residue characteristic of F and if G is a classical group, then the G-representation (*) is irreducible. This is the analog of a theorem of Casselman (which says the same for L= C); it had been conjectured by Vign\'eras. Herzig (for G= GLn(F)) and Abe (for general G) have given classification theorems for irreducible admissible modulo p representations of G in terms of supersingular representations. Some of their arguments rely on the present work.