Kadison-Kastler stable factors

Abstract

A conjecture of Kadison and Kastler from 1972 asks whether sufficiently close operator algebras in a natural uniform sense must be small unitary perturbations of one another. For n≥ 3 and a free ergodic probability measure preserving action of SLn( Z) on a standard nonatomic probability space (X,μ), write M=((L∞(X,μ) SLn( Z))\,\, R, where R is the hyperfinite II1 factor. We show that whenever M is represented as a von Neumann algebra on some Hilbert space H and N⊂eq B( H) is sufficiently close to M, then there is a unitary u on H close to the identity operator with uMu*=N. This provides the first nonamenable class of von Neumann algebras satisfying Kadison and Kastler's conjecture. We also obtain stability results for crossed products L∞(X,μ) whenever the comparison map from the bounded to usual group cohomology vanishes in degree 2 for the module L2(X,μ). In this case, any von Neumann algebra sufficiently close to such a crossed product is necessarily isomorphic to it. In particular, this result applies when is a free group.