Von Neumann Algebras of Thompson-like Groups from Cloning Systems II

Abstract

Let (Gn)n ∈ N be a sequence of groups equipped with a d-ary cloning system and denote by Td(G*) the resulting Thompson-like group. In previous work joint with Zaremsky, we obtained structural results concerning the group von Neumann algebra of Td(G*), denoted by L(Td(G*)). Under some natural assumptions on the d-ary cloning system, we proved that L(Td(G*)) is a type II1 factor. With a few additional natural assumptions, we proved that L(Td(G*)) is, moreover, a McDuff factor. In this paper, we further analyze the structure of L(Td(G*)), in particular the inclusion L(Fd) ⊂eq L(Td(G*)), where Fd is the smallest of the Higman--Thompson groups. We prove that if the d-ary cloning system is ``diverse," then L(Fd) ⊂eq L(Td(G*)) satisfies the weak asymptotic homomorphism property. As a consequence, the inclusion is irreducible, which is a considerable improvement of our result that L(Td(G*)) is a type II1 factor, and the inclusion is also singular. Then we look at examples of non-diverse d-ary cloning systems with respect to the weak asymptotic homomorphism property, singularity, and irreducibility. Then we finish the paper with some applications. We construct a machine which takes in an arbitrary group and finite group and produces an inclusion (both finite and infinite index) of type II1 factors which is singular but without the weak asymptotic homomorphism property. Finally, using irreducibility of the inclusion L(Fd) ⊂eq L(Td(G*)), our conditions for when L(Td(G*)) is a McDuff factor, and the fact that Higman-Thompson groups Fd are character rigid (in the sense of Peterson), we prove that the groups Fd are McDuff (in the sense of Deprez-Vaes).