On Polynilpotent Covering Groups of a Polynilpotent Group

Abstract

Let Nc1,...,ct be the variety of polynilpotent groups of class row (c1,...,ct). In this paper, first, we show that a polynilpotent group G of class row (c1,...,ct) has no any Nc1,...,ct,ct+1-covering group if its Baer-invariant with respect to the variety Nc1,...,ct,ct+1 is nontrivial. As an immediate consequence, we can conclude that a solvable group G of length c with nontrivial solvable multiplier, SnM(G), has no Sn-covering group for all n>c, where Sn is the variety of solvable groups of length at most n. Second, we prove that if G is a polynilpotent group of class row (c1,...,ct,ct+1) such that Nc'1,...,c't,c't+1M(G)≠ 1, where c'i≥ ci for all 1≤ i≤ t and c't+1>ct+1, then G has no any Nc'1,...,c't,c't+1-covering group. This is a vast generalization of the first author's result on nilpotent covering groups (Indian\ J.\ Pure\ Appl.\ Math.\ 29(7)\ 711-713,\ 1998).