A Conjugate System for Twisted Araki-Woods von Neumann Algebras of finite dimensional spaces

Abstract

We compute the conjugate system of twisted Araki-Woods von Neumann algebras LT(H) for a compatible braided crossing symmetric twist T on a finite dimensional Hilbert space H with norm \|T\| <1. This implies that those algebras have finite non-microstates free Fisher information and therefore are always factors of type IIIλ (0<λ≤ 1) or II1 . Moreover, using the nontracial free monotone transport, we show that LT(H) is isomorphic to the free Araki-Woods algebra L0(H) when \|T\|=q is small enough.