Amenable dynamical systems over locally compact groups

Abstract

We establish several new characterizations of amenable W*- and C*-dynamical systems over arbitrary locally compact groups. In the W*-setting we show that amenability is equivalent to (1) a Reiter property and (2) the existence of a certain net of completely positive Herz-Schur multipliers of (M,G,α) converging point weak* to the identity of GM. In the C*-setting, we prove that amenability of (A,G,α) is equivalent to an analogous Herz-Schur multiplier approximation of the identity of the reduced crossed product G A, as well as a particular case of the positive weak approximation property of B\'edos and Conti (generalized the locally compact setting). When Z(A**)=Z(A)**, it follows that amenability is equivalent to the 1-positive approximation property of Exel and Ng. In particular, when A=C0(X) is commutative, amenability of (C0(X),G,α) coincides with topological amenability the G-space (G,X). Our results answer 2 open questions from the literature; one of Anantharaman--Delaroche, and one from recent work of Buss--Echterhoff--Willett.