McKay graphs for alternating and classical groups

Abstract

Let G be a finite group, and α a nontrivial character of G. The McKay graph M(G,α) has the irreducible characters of G as vertices, with an edge from 1 to 2 if 2 is a constituent of α1. We study the diameters of McKay graphs for finite simple groups G. For alternating groups, we prove a conjecture made in [LST]: there is an absolute constant C such that diam\, M(G,α) C |An| α(1) for all nontrivial irreducible characters α of An. Also for classsical groups of symplectic or orthogonal type of rank r, we establish a linear upper bound Cr on the diameters of all nontrivial McKay graphs.