On palindromic width of certain extensions and quotients of free nilpotent groups

Abstract

In arXiv:1303.1129, the authors provided a bound for the palindromic width of free abelian-by-nilpotent group ANn of rank n and free nilpotent group Nn,r of rank n and step r. In the present paper we study palindromic widths of groups ANn and Nn,r. We denote by Gn = Gn / x12, …, xn2 the quotient of group Gn = x1, …, xn , which is free in some variety by the normal subgroup generated by x12, …, xn2. We prove that the palindromic width of the quotient ANn is finite and bounded by 3n. We also prove that the palindromic width of the quotient Nn, 2 is precisely 2(n-1). We improve the lower bound of the palindromic width for Nn, r. We prove that the palindromic width of Nn, r, r≥ 2 is at least 2(n-1). We also improve the bound for palindromic widths of free metabelian groups. We prove that the palindromic width of free metabelian group of rank n is at most 4n-1.