Distinguishing finite group characters and refined local-global phenomena

Abstract

Serre obtained a sharp bound on how often two irreducible degree n complex characters of a finite group can agree, which tells us how many local factors determine an Artin L-function. We consider the more delicate question of finding a sharp bound when these objects are primitive, and answer these questions for n=2,3. This provides some insight on refined strong multiplicity one phenomena for automorphic representations of GL(n). For general n, we also answer the character question for the families PSL(2,q) and SL(2,q).