A generalized character related to the local structure and representation theory of a finite group

Abstract

We consider the generalized character 1,p,G of a finite group G which vanishes on all p-singular elements of G and whose value at each p-regular y ∈ G is the number of p-elements of CG(y). We conjecture that this is always a character, and may be afforded by a projective RG-module, where R is an appropriate complete discrete valuation ring whose residue field has characteristic p. We examine a number of case where this is the case, and consider consequences for the representation theory and character theory of G when this conjecture is known to hold. In particular, we prove, among other things, that the conjecture is valid for all primes p in the case that G PSL(2,q) or SL(2,q) for every prime power q.