On residualizing homomorphisms preserving quasiconvexity

Alonso J.; Bridson M.; Dugundji J.; Ghys E.; Gromov M.; Gromov M.; Grunschlag Z.; Lyndon R.; Mihajlovskii K. V.; Ol'shanskii A. Yu.; Ol'shanskii A. Yu.

research

On residualizing homomorphisms preserving quasiconvexity

Authors: Alonso J.
Bridson M.
Dugundji J.
Ghys E.
Gromov M.
Gromov M.
Grunschlag Z.
Lyndon R.
Mihajlovskii K. V.
Ol'shanskii A. Yu.
Ol'shanskii A. Yu.
Publication date: 1 January 2005
Publisher: 'Informa UK Limited'
Doi

Abstract

H is called a G-subgroup of a hyperbolic group G if for any finite subset M G there exists a homomorphism from G onto a non-elementary hyperbolic group G_1 that is surjective on H and injective on M. In his paper in 1993 A. Ol'shanskii gave a description of all G-subgroups in any given non-elementary hyperbolic group G. Here we show that for the same class of G-subgroups the finiteness assumption on M (under certain natural conditions) can be replaced by an assumption of quasiconvexity

Similar works

Full text

Available Versions

Southampton (e-Prints Soton)

oai:eprints.soton.ac.uk:46727

Last time updated on 02/07/2012

MUCC (Crossref)

Last time updated on 05/06/2019