Steinberg-like characters for finite simple groups

Abstract

Let G be a finite group and, for a prime p, let S be a Sylow p-subgroup of G. A character of G is called p-regular if the restriction of to S is the character of the regular representation of S. If, in addition, vanishes at all elements of order divisible by p, is said to be Steinberg-like. For every finite simple group G we determine all primes p for which G admits a Steinberg-like character, except for alternating groups in characteristic~2. Moreover, we determine all primes for which G has a projective FG-module of dimension |S|, where F is an algebraically closed field of characteristic~p.