6533b82afe1ef96bd128b690

RESEARCH PRODUCT

Archimedean actions on median pretrees

John CrispBrian H. Bowditch

subject

Discrete mathematicsCombinatoricsGroup actionBetweenness centralityGroup (mathematics)General MathematicsFace (geometry)Convergence (routing)Countable setAction (physics)Mathematics

description

In this paper we consider group actions on generalized treelike structures (termed ‘pretrees’) defined simply in terms of betweenness relations. Using a result of Levitt, we show that if a countable group admits an archimedean action on a median pretree, then it admits an action by isometries on an [open face R]-tree. Thus the theory of isometric actions on [open face R]-trees may be extended to a more general setting where it merges naturally with the theory of right-orderable groups. This approach has application also to the study of convergence group actions on continua.

yearjournalcountryeditionlanguage
2001-05-01Mathematical Proceedings of the Cambridge Philosophical Society
https://doi.org/10.1017/s0305004101004996