Structural results for free Araki-Woods factors and their continuous cores

Abstract

We show that for any type III1 free Araki-Woods factor M = (H, Ut)" associated with an orthogonal representation (Ut) of on a separable real Hilbert space H, the continuous core M = M σ is a semisolid II∞ factor, i.e. for any non-zero finite projection q ∈ M, the II1 factor qMq is semisolid. If the representation (Ut) is moreover assumed to be mixing, then we prove that the core M is solid. As an application, we construct an example of a non-amenable solid II1 factor N with full fundamental group, i.e. F(N) = *+, which is not isomorphic to any interpolated free group factor L(t), for 1 < t ≤ +∞.