Unitary conjugacy for type III subfactors and W*-superrigidity

Abstract

Let A,B⊂ M be inclusions of σ-finite von Neumann algebras such that A and B are images of faithful normal conditional expectations. In this article, we investigate Popa's intertwining condition AMB using their modular actions. In the main theorem, we prove that if AMB holds, then an intertwining element for AMB also intertwines some modular flows of A and B. As a result, we deduce a new characterization of AMB in terms of their continuous cores. Using this new characterization, we prove the first W*-superrigidity type result for group actions on amenable factors. As another application, we characterize stable strong solidity for free product factors in terms of their free product components.