The McKay Conjecture on character degrees

Abstract

We prove that for any prime , any finite group has as many irreducible complex characters of degree prime to as the normalizers of its Sylow -subgroups. This equality was conjectured by John McKay. The conjecture was reduced by Isaacs--Malle--Navarro (2007) to a conjecture on representations, linear and projective, of finite simple groups that we finish proving here using the classification of those groups. We study mainly characters of normalizers N G( S)F of Sylow d-tori S (d≥ 3) in a simply-connected algebraic group G of type Dl (l≥ 4) for which F is a Frobenius endomorphism. We also introduce a certain class of F-stable reductive subgroups M≤ G of maximal rank where M is of type some Dk×\ Dl-k. The finite groups MF are an efficient substitute for N G( S)F or the -local subgroups of GF relevant to McKay's abstract statement. For a general class of those subgroups MF we describe their characters and the action of Aut( GF) MF on them, showing in particular that Irr( MF) and Irr( GF) share some key features in that regard.

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