Action graphs, semiconjugacy, and non-embedding in Thompson's group V

Abstract

We prove a variety of results about subgroups of Thompson's group V. First we prove that every action graph of a finitely generated subgroup of V acting on an orbit in Cantor space is quasi-isometric to a tree. Then we prove that for a broad class of groups of homeomorphisms of the real line, for example Thompson's group F, any action on the Cantor space via an embedding into Thompson's group V must be semiconjugate to the standard action on the line. Finally, we use this to establish that many such groups cannot embed into V; in particular the Stein group F2,3 cannot embed in V, answering a question of the third author.