Absence of Cartan subalgebras for right-angled Hecke von Neumann algebras

Abstract

For a right-angled Coxeter system (W,S) and q>0, let Mq be the associated Hecke von Neumann algebra, which is generated by self-adjoint operators Ts, s ∈ S satisfying the Hecke relation (q\: Ts - q) (q \: Ts + 1) = 0 as well as suitable commutation relations. Under the assumption that (W, S) is irreducible and S ≥ 3 it was proved by Garncarek that Mq is a factor (of type II1) for a range q ∈ [, -1] and otherwise Mq is the direct sum of a II1-factor and C. In this paper we prove (under the same natural conditions as Garncarek) that Mq is non-injective, that it has the weak- completely contractive approximation property and that it has the Haagerup property. In the hyperbolic factorial case Mq is a strongly solid algebra and consequently Mq cannot have a Cartan subalgebra. In the general case Mq need not be strongly solid. However, we give examples of non-hyperbolic right-angled Coxeter groups such that Mq does not possess a Cartan subalgebra.