On the minimal dimension of a faithful linear representation of a finite group

Abstract

The representation dimension of a finite group G is the minimal dimension of a faithful complex linear representation of G. We prove that the representation dimension of any finite group G is at most |G| except if G is a 2-group with elementary abelian center of order 8 and all irreducible characters of G whose kernel does not contain Z(G) are fully ramified with respect to G/Z(G). We also obtain bounds for the representation dimension of quotients of G in terms of the representation dimension of G, and discuss the relation of this invariant with the essential dimension of G.