Growth of actions of solvable groups

Abstract

Given a finitely generated group G, we are interested in common geometric properties of all graphs of faithful actions of G. In this article we focus on their growth. We say that a group G has a Schreier growth gap f(n) if every faithful G-set X satisfies volG, X(n) f(n), where volG, X(n) is the growth of the action of G on X. Here we study Schreier growth gaps for finitely generated solvable groups. We prove that if a metabelian group G is either finitely presented or torsion-free, then G has a Schreier growth gap n2, provided G is not virtually abelian. We also prove that if G is a metabelian group of Krull dimension k, then G has a Schreier growth gap nk. For instance the wreath product Cp Zd has a Schreier growth gap nd, and Z Zd has a Schreier growth gap nd+1. These lower bounds are sharp. For solvable groups of finite Pr\"ufer rank, we establish a Schreier growth gap (n), provided G is not virtually nilpotent. This covers all solvable groups that are linear over Q. Finally for a vast class of torsion-free solvable groups, which includes solvable groups that are linear, we establish a Schreier growth gap n2.

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