Ergodic states on type III1 factors and ergodic actions

Abstract

Since the early days of Tomita-Takesaki theory, it is known that a von Neumann algebra M that admits a state with trivial centralizer M must be a type III1 factor, but the converse remained open. We solve this problem and prove that such ergodic states form a dense Gδ set among all faithful normal states on any III1 factor with separable predual. Through Connes' Radon-Nikodym cocycle theorem, this problem is related to the existence of ergodic cocycle perturbations for outer group actions, which we consider in the second part of the paper.