Expanders, rank and graphs of groups
群论
2007-05-23 v2 几何拓扑
摘要
Let G be a finitely presented group, and let {G_i} be a collection of finite index normal subgroups that is closed under intersections. Then, we prove that at least one of the following must hold: 1. G_i is an amalgamated free product or HNN extension, for infinitely many i; 2. the Cayley graphs of G/G_i (with respect to a fixed finite set of generators for G) form an expanding family; 3. inf_i (d(G_i)-1)/[G:G_i] = 0, where d(G_i) is the rank of G_i. The proof involves an analysis of the geometry and topology of finite Cayley graphs. Several applications of this result are given.
引用
@article{arxiv.math/0403127,
title = {Expanders, rank and graphs of groups},
author = {Marc Lackenby},
journal= {arXiv preprint arXiv:math/0403127},
year = {2007}
}
备注
13 pages; to appear in Israel J. Math