The Bernstein center in natural characteristic

Abstract

Let G be a locally profinite group and let k be a field of positive characteristic p. Let Z(G) denote the center of G and let Z(G) denote the Bernstein center of G, that is, the k-algebra of natural endomorphisms of the identity functor on the category of smooth k-linear representations of G. We show that if G contains an open pro-p subgroup but no proper open centralisers, then there is a natural isomorphism of k-algebras Z(Z(G)) Z(G). We also describe Z(Z(G)) explicitly as a particular completion of the abstract group ring k[Z(G)]. Both conditions on G are satisfied whenever G is the group of points of any connected smooth algebraic group defined over a local field of residue characteristic p. In particular, when the algebraic group is semisimple, we show that Z(G) = k[Z(G)].