Invariants for metabelian groups of prime power exponent, colorings and stairs

Abstract

We study the free metabelian group M(2,n) of prime power exponent n on two generators by means of invariants M(2,n)' Zn that we construct from colorings of the squares in the integer grid R × Z Z × R. In particular we improve bounds found by M.F. Newman for the order of M(2,2k). We study identities in M(2,n), which give information about identities in the Burnside group B(2,n) and the restricted Burnside group R(2,n).