Von Neumann Algebras of Equivalence Relations with Nontrivial One-Cohomology

Abstract

Using Popa's deformation/rigidity theory, we investigate prime decompositions of von Neumann algebras of the form L(R) for countable probability measure preserving equivalence relations R. We show that L(R) is prime whenever R is nonamenable, ergodic, and admits an unbounded 1-cocycle into a mixing orthogonal representation weakly contained in the regular representation. This is accomplished by constructing the Gaussian extension R of R and subsequently an s-malleable deformation of the inclusion L(R) ⊂ L(R). We go on to note a general obstruction to unique prime factorization, and avoiding it, we prove a unique prime factorization result for products of the form L(R1) L(R2) ·s L(Rk). As a corollary, we get a unique factorization result in the equivalence relation setting for products of the form R1 × R2 × ·s × Rk. We finish with an application to the measure equivalence of groups.