On the -modular composition factors of the Steinberg representation

Abstract

Let G be a finite group of Lie type and k be the Steinberg representation of G, defined over a field k. We are interested in the case where k has prime characteristic~ and k is reducible. Tinberg has shown that the socle of k is always simple. We give a new proof of this result in terms of the Hecke algebra of G with respect to a Borel subgroup and show how to identify the simple socle of k among the principal series representations of~G. Furthermore, we determine the composition length of k when G=n(q) or G is a finite classical group and is a so-called linear prime.