A Few Observations on Weaver's Quantum Relations

Abstract

The concept of quantum relation R over a von Neumann algebra M has been recently introduced by Nik Weaver. When M is either finite dimensional or discrete and abelian, R is given by an orthogonal projection in M Mop. Here, we generalize such result to general von Neumann algebras, proving that quantum relations are in bijective correspondence with weak- closed left ideals inside M e h M, where e h is the extended Haagerup tensor product. The correspondence between the two is given by identifying M e h M with M'-bimodular operators and proving a double annihilator relation. Given an action of a group/quantum group on M we give a definition for invariant quantum relations and prove that, in the case of group von Neumann algebras L G, invariant quantum relations are left ideals in the measure algebra M G. At the end we explore possible applications to noncommutative harmonic analysis, in particular noncommutative Gaussian bounds.