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Periodic quotients of hyperbolic and large groups

Periodic quotients of hyperbolic and large groups
Periodic quotients of hyperbolic and large groups
Let G be either a non-elementary (word) hyperbolic group or a large group (both in the sense of Gromov). In this paper we describe several approaches for constructing continuous families of periodic quotients of G with various properties.
The first three methods work for any non-elementary hyperbolic group, producing three different continua of periodic quotients of G. They are based on the results and techniques, that were developed by Ivanov and Olshanskii in order to show that there exists an integer n such that G/G^n is an infinite group of exponent n.
The fourth approach starts with a large group G and produces a continuum of pairwise non-isomorphic periodic residually finite quotients. Speaking of a particular application, we use each of these methods to give a positive answer to a question of Wiegold from Kourovka Notebook.
hyperbolic groups, large groups, periodic quotients
1661-7207
423-452
Minasyan, Ashot
3de640f5-d07b-461f-b130-5b1270bfdb3d
Olshanskii, Alexander Yu.
006ec15a-c673-4cde-b0e6-9853062d638b
Sonkin, Dmitriy
463efd14-2559-4551-895c-7b2a6d7434a7
Minasyan, Ashot
3de640f5-d07b-461f-b130-5b1270bfdb3d
Olshanskii, Alexander Yu.
006ec15a-c673-4cde-b0e6-9853062d638b
Sonkin, Dmitriy
463efd14-2559-4551-895c-7b2a6d7434a7

Minasyan, Ashot, Olshanskii, Alexander Yu. and Sonkin, Dmitriy (2009) Periodic quotients of hyperbolic and large groups. Groups, Geometry and Dynamics, 3 (3), 423-452. (doi:10.4171/GGD/65).

Record type: Article

Abstract

Let G be either a non-elementary (word) hyperbolic group or a large group (both in the sense of Gromov). In this paper we describe several approaches for constructing continuous families of periodic quotients of G with various properties.
The first three methods work for any non-elementary hyperbolic group, producing three different continua of periodic quotients of G. They are based on the results and techniques, that were developed by Ivanov and Olshanskii in order to show that there exists an integer n such that G/G^n is an infinite group of exponent n.
The fourth approach starts with a large group G and produces a continuum of pairwise non-isomorphic periodic residually finite quotients. Speaking of a particular application, we use each of these methods to give a positive answer to a question of Wiegold from Kourovka Notebook.

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Published date: 2009
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Keywords: hyperbolic groups, large groups, periodic quotients

Identifiers

Local EPrints ID: 143197
URI: http://eprints.soton.ac.uk/id/eprint/143197
DOI: doi:10.4171/GGD/65
ISSN: 1661-7207
PURE UUID: 5bfe2a1b-2a0b-4026-b456-155e9a944988
ORCID for Ashot Minasyan: ORCID iD orcid.org/0000-0002-4986-2352

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Date deposited: 08 Apr 2010 10:18
Last modified: 14 Mar 2024 02:53

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Author: Ashot Minasyan ORCID iD
Author: Alexander Yu. Olshanskii
Author: Dmitriy Sonkin

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