arXiv:math/0606232 Abstract

arXiv:math/0606232 [math.GR]Abstract References Reviews Resources

Amenable groups that act on the line

Published 2006-06-09, updated 2009-07-29Version 3

Let Gamma be a finitely generated, amenable group. Using an idea of E Ghys, we prove that if Gamma has a nontrivial, orientation-preserving action on the real line, then Gamma has an infinite, cyclic quotient. (The converse is obvious.) This implies that if Gamma has a faithful action on the circle, then some finite-index subgroup of Gamma has the property that all of its nontrivial, finitely generated subgroups have infinite, cyclic quotients. It also means that every left-orderable, amenable group is locally indicable. This answers a question of P Linnell.

Comments: This is the version published by Algebraic & Geometric Topology on 15 December 2006

Journal: Algebr. Geom. Topol. 6 (2006) 2509-2518

DOI: 10.2140/agt.2006.6.2509

Categories: math.GR, math.DS, math.GT, math.RT

Subjects: 20F60, 06F15, 37C85, 37E05, 37E10, 43A07, 57S25

Keywords: amenable group, cyclic quotient, nontrivial, real line, finite-index subgroup

Tags: journal article

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