Classification of regular subalgebras of injective type III factors

Abstract

We provide a complete classification for regular subalgebras B ⊂ M of injective factors satisfying a natural relative commutant condition. We show that such subalgebras are classified by their associated amenable discrete measured groupoid G= GB ⊂ M and the action mod(α) of G on the flow of weights induced by the cocycle action (α,u) of G on B. We obtain a similar result for triple inclusions A ⊂ B ⊂ M where M is an injective factor, A is a Cartan subalgebra of M, and B ⊂ M is regular, showing that such inclusions are also classified by their associated groupoid G = GB ⊂ M and the induced action on the flow of weights. Given such a discrete measured amenable groupoid G, we also construct a model action of G on a field of Cartan inclusions with prescribed action on the associated field of flows.