Some Baer Invariants of Free Nilpotent Groups
Abstract
We present an explicit structure for the Baer invariant of a free nth nilpotent group (the nth nilpotent product of infinite cyclic groups, Zn* Zn*...n*Z) with respect to the variety V with the set of words V=\[c1+1,c2+1]\, for all c1≥ c2 and 2c2-c1>2n-2. Also, an explicit formula for the polynilpotent multiplier of a free nth nilpotent group is given for any class row (c1,c2,...,ct), where c1≥ n.
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