Action of automorphisms on irreducible characters of groups of type A

Abstract

Let G be a finite group isomorphic to SLn(q) or SUn(q) for some prime power q. In this paper, we give an explicit description of the action of automorphisms of G on the set of its irreducible complex characters. This is done by showing that irreducible constituents of restrictions of irreducible characters of GLn(q) (resp. GUn(q)) to SLn(q) (resp. SUn(q)) can be distinguished by the rational classes of their unipotent support which are equivariant under the action of automorphisms. Meanwhile, we give a criterion to explicitly determine whether an irreducible character is a constituent of a given generalized Gelfand-Graev character of G. As as application, we give a short proof of the global side of Sp\" ath's criterion for the inductive McKay condition for the irreducible characters of G.