Geometry of Generated Groups with Metrics Induced by Their Cayley Color Graphs

Geometry of Generated Groups with Metrics Induced by Their Cayley Color Graphs

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) an...

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Bibliographic Details
Main Author: Suksumran Teerapong
Format: Article
Language:English
Published: De Gruyter 2019-03-01
Series:Analysis and Geometry in Metric Spaces
Subjects:
cardinal metric
cayley graph
color-permuting automorphism
color-preserving automorphism
isometry of metric space
primary 20f65
secondary 05c25, 05c12, 20f38
Online Access:https://doi.org/10.1515/agms-2019-0002
Description
Summary: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 quasiisometric 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 colorpermuting and color-preserving automorphisms of Cayley digraphs are isometries with respect to cardinal metrics.
ISSN:2299-3274

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