On the diameters of McKay graphs for finite simple 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 simple groups G. For G a group of Lie type, we show that for any α, the diameter is bounded by a quadratic function of the rank, and obtain much stronger bounds for G= PSLn(q) or PSUn(q). We also bound the diameter for symmetric and alternating groups.
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