On the realization of the Gelfand Character of a finite group as a twisted trace

Abstract

We show that the Gelfand character G of a finite group G (i.e. the sum of all irreducible complex characters of G ) may be realized as a `` twisted trace'' g Tr( g T) for a suitable involutive linear automorphism T of L2(G), where (L2(G), ) is the right regular representation of G. Moreover, we prove that under certain hypotheses T(f)= f L \;\; (f ∈ L2(G)), where L is an involutive antiautomorphism of G. The natural representation τ of G associated to the natural L-conjugacy action of G in the fixed point set FixG(L) of L turns out to be a Gelfand Model for G in some cases. We show that (L2(FixG(L)), τ) fails to be a Gelfand Model if G admits non trivial central involutions.