On Kp-series and varieties generated by wreath products of p-groups

Abstract

Let A be a nilpotent p-group of finite exponent, and B be an abelian p-groups of finite exponent. Then the wreath product A Wr B generates the variety var(A) var(B) if and only if the group B contains a subgroup isomorphic to the direct product Cpv∞ of at least countably many copies of the cyclic group Cpv of order pv = (B). The obtained theorem continues our previous study of cases when var(A Wr B ) = var(A) var(B) holds for some other classes of groups A and B (abelian groups, finite groups, etc.).