Author:
Ciobanu Laura,Cox Charles Garnet,Martino Armando
Abstract
AbstractIn this paper we introduce and study the conjugacy ratio of a finitely generated group, which is the limit at infinity of the quotient of the conjugacy and standard growth functions. We conjecture that the conjugacy ratio is 0 for all groups except the virtually abelian ones, and confirm this conjecture for certain residually finite groups of subexponential growth, hyperbolic groups, right-angled Artin groups and the lamplighter group.
Publisher
Cambridge University Press (CUP)
Reference13 articles.
1. The Degree of Polynomial Growth of Finitely Generated Nilpotent Groups
2. L. Ciobanu , S. Hermiller and V. Mercier , Conjugacy growth in graph products, preprint, 2017.
3. Y. Antolín , A. Martino and E. Ventura , Degree of commutativity of infinite groups, Proceedings of the American Mathematical Society (AMS, 2017).
4. Mesures de Patterson-Sullivan sur le bord d’un espace hyperbolique au sens de Gromov
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