Separation properties for positive-definite functions on locally compact quantum groups and for associated von Neumann algebras

Abstract

Using Godement mean on the Fourier-Stieltjes algebra of a locally compact quantum group we obtain strong separation results for quantum positive-definite functions associated to a subclass of representations, strengthening for example the known relationship between amenability of a discrete quantum group and existence of a net of finitely supported quantum positive-definite functions converging pointwise to I. We apply these results to show that von Neumann algebras of unimodular discrete quantum groups enjoy a strong form of non-w*-CPAP, which we call the matrix ε-separation property.