Geometry of generated groups with metrics induced by their Cayley color graphs

Abstract

Let G be a group and let S be a generating set of G. In this article, we introduce a metric dC on G with respect to S, called the cardinal metric. We then compare geometric structures of (G, dC) and (G, dW), where dW denotes the word metric. In particular, we prove that if S is finite, then (G, dC) and (G, dW) are not quasi-isometric in the case when (G, dW) has infinite diameter and they are bi-Lipschitz equivalent otherwise. We also give an alternative description of cardinal metrics by using Cayley color graphs. It turns out that color-permuting and color-preserving automorphisms of Cayley digraphs are isometries with respect to cardinal metrics.