Harmonic cocycles, von Neumann algebras, and irreducible affine isometric actions

Abstract

Let G be a compactly generated locally compact group and (π, H) a unitary representation of G. The 1-cocycles with coefficients in π which are harmonic (with respect to a suitable probability measure on G) represent classes in the first reduced cohomology H1(G,π). We show that harmonic 1-cocycles are characterized inside their reduced cohomology class by the fact that they span a minimal closed subspace of H. In particular, the affine isometric action given by a harmonic cocycle b is irreducible (in the sense that H contains no non-empty, proper closed invariant affine subspace) if the linear span of b(G) is dense in H. The converse statement is true, if π moreover has no almost invariant vectors. Our approach exploits the natural structure of the space of harmonic 1-cocycles with coefficients in π as a Hilbert module over the von Neumann algebra π(G)', which is the commutant of π(G). Using operator algebras techniques, such as the von Neumann dimension, we give a necessary and sufficient condition for a factorial representation π without almost invariant vectors to admit an irreducible affine action with π as linear part.