The conjugacy problem for Thompson-like groups

Abstract

In this paper we generalize techniques of Belk-Matucci to solve the conjugacy problem for every Thompson-like group Vn(H), where n ≥ 2 and H is a subgroup of the symmetric group on n elements. We use this to prove that, if n ≠ m, Vn(H) is not isomorphic to Vm(G) for any H,G.