Bi-Lipschitz equivalent metrics on groups, and a problem in additive number theory

Abstract

There is a standard "word length" metric canonically associated to any set of generators for a group. In particular, for any integers a and b greater than 1, the additive group of integers has generating sets aii=0∞ and bjj=0∞ with associated metrics dA and dB, respectively. It is proved that these metrics are bi-Lipschitz equivalent if and only if there exist positive integers m and n such that am = bn.