Powers in the wreath product of G with Sn

Abstract

In this paper we compute powers in the wreath product G Sn, for any finite group G. For r≥ 2, a prime, consider ωr: G Sn G Sn defined by g gr. Let Pr(G Sn)=|ωr(G Sn)||G|n n!, be the probability that a randomly chosen element in G Sn is a rth power. We prove, Pr(G Sn+1)=Pr(G Sn) for all n -1(mod r) if, order of G is coprime to r. We also give a formula for the number of conjugacy classes that are rth powers in G Sn.