arXiv:1107.1826 Abstract | arXiv Analytics

arXiv:1107.1826 [math.GR]Abstract References Reviews Resources

Conjugacy growth of finitely generated groups

Published 2011-07-10, updated 2015-01-27Version 3

We show that every non-decreasing function $f\colon \mathbb N\to \mathbb N$ bounded from above by $a^n$ for some $a\ge 1$ can be realized (up to a natural equivalence) as the conjugacy growth function of a finitely generated group. We also construct a finitely generated group $G$ and a subgroup $H\le G$ of index 2 such that $H$ has only 2 conjugacy classes while the conjugacy growth of $G$ is exponential. In particular, conjugacy growth is not a quasi-isometry invariant.

Comments: The published version of this paper contained an inaccuracy in the proof of Corollary 5.6, which is corrected in this version

Journal: Adv. Math. 235 (2013), 361-389

Categories: math.GR, math.GT

Subjects: 20F69, 20E45, 20F65, 20F67

Keywords: finitely generated group, conjugacy growth function, quasi-isometry invariant, conjugacy classes, natural equivalence

Tags: journal article

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