The Bernstein center of the category of smooth W(k)[GLn(F)]-modules

Abstract

We consider the category of smooth W(k)[GLn(F)]-modules, where F is a p-adic field and k is an algebraically closed field of characteristic l different from p. We describe a factorization of this category into blocks, and show that the center of each block is a reduced, finite type, l-torsion free W(k)-algebra. Moreover, the k-points of the center of each block are in bijection with the possible "supercuspidal supports" of the smooth k[GLn(F)]-modules that lie in the block. Finally, we describe a large, explicit subalgebra of the center of each block and give a description of the action of this subalgebra on the simple objects of the block, in terms of the description of the classical "characteristic zero" Bernstein center.