Centralizers in R. Thompson's group Vn

Abstract

Let n be bigger than 1 and let A be an element in the Higman-Thompson group Vn. We study the structure of the centralizer of a in Vn through a careful analysis of the action of the group generated by A on the Cantor set C. We make use of revealing tree pairs as developed by Brin and Salazar from which we derive discrete train tracks to assist us in our analysis. A consequence of our structure theorem is that centralizers are finitely generated. Along the way we give a short argument using revealing tree pairs which shows that cyclic groups are undistorted in Vn.