Weak separation properties for closed subgroups of locally compact groups

Abstract

Three separation properties for a closed subgroup H of a locally compact group G are studied: (1) the existence of a bounded approximate indicator for H, (2) the existence of a completely bounded invariant projection of VN(G) onto VNH(G), and (3) the approximability of the characteristic function H by functions in McbA(G) with respect to the weak* topology of McbA(Gd). We show that the H-separation property of Kaniuth and Lau is characterized by the existence of certain bounded approximate indicators for H and that a discretized analogue of the H-separation property is equivalent to (3). Moreover, we give a related characterization of amenability of H in terms of any group G containing H as a closed subgroup. The weak amenability of G or that Gd satisfies the approximation property, in combination with the existence of a natural projection (in the sense of Lau and \"Ulger), are shown to suffice to conclude (3). Several consequences of (2) involving the cb-multiplier completion of A(G) are given. Finally, a convolution technique for averaging over the closed subgroup H is developed and used to weaken a condition for the existence of a bounded approximate indicator for H.