On irreducible representations of conjugacy quandles

Abstract

For G a finite group, one way to construct irreducible quandle representations over C of the conjugacy quandle Conj(G) is by taking the product of an irreducible linear group representation of G by what we call a quandle character of Conj(G) (a quandle morphism into C× ). We show that these are all the irreducible quandle representations of Conj(G) over C if and only if all the symmetric 2-cocyles over G (α(g,h)=α(h,g) for all g,h) with values in C× are coboundaries. For instance, this is the case of groups with trivial Bogomolov multiplier. We apply this to study the enveloping group of Conj(G). If G finite satisfies the previous condition on symmetric 2-cocycles, we obtain that the enveloping group of Conj(G) injects into G× ZcG where cG is the number of the conjugacy classes of G. If moreover G is perfect the injection is an isomorphism.