arXiv:2101.03060 Abstract | arXiv Analytics

arXiv:2101.03060 [math.GT]Abstract References Reviews Resources

Convex cores for actions on finite-rank median algebras

Published 2021-01-08Version 1

We show that every action of a finitely generated group on a finite-rank median algebra admits a nonempty "convex core", even when no metric or topology is given. We then use this to deduce an analogue of the flat torus theorem for actions on connected finite-rank median spaces. We also prove that isometries of connected finite-rank median spaces are either elliptic or loxodromic.

Comments: 28 pages, no figures

Categories: math.GT, math.GR

Keywords: convex core, connected finite-rank median spaces, finite-rank median algebra admits, flat torus theorem, finitely generated group

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