Identities of relatively free algebras of Lie nilpotent associative algebras
Abstract
In this paper, we consider the relatively free algebra of rank n, Fn(Np), in the variety of Lie nilpotent associative algebras of index p, denoted by Np, over a field of characteristic zero. We describe an explicit minimal basis for the polynomial identities of Fn(Np) when p=3 and p=4, for all n, except for F3(N4). In the general case, we exhibit a lower and an upper bound for the minimal k such that [x1,x2]·s[x2k-1,x2k] is an identity for Fn(Np) for all n and for all p.
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