On the pro-p Iwahori Hecke Ext-algebra of SL2( Qp)

Abstract

Let G= SL2( F) where F is a finite extension of Qp. We suppose that the pro-p Iwahori subgroup I of G is a Poincar\'e group of dimension d. Let k be a field containing the residue field of F. In this article, we study the graded Ext-algebra E*=ExtMod(G)*(k[G/I], k[G/I]). Its degree zero piece E0 is the usual pro-p Iwahori-Hecke algebra H. We study Ed as an H-bimodule and deduce that for an irreducible admissible smooth representation of G, we have Hd(I,V)=0 unless V is the trivial representation. When F= Qp with p≥ 5, we have d=3. In that case we describe E* as an H-bimodule and give the structure as an algebra of the centralizer in E* of the center of H. We deduce results on the values of the functor H*(I, -) which attaches to a (finite length) smooth k-representation V of G its cohomology with respect to I. We prove that H*(I,V) is always finite dimensional. Furthermore, if V is irreducible, then V is supersingular if and only if H*(I,V) is a supersingular H-module.