Approximate indicators for closed subgroups of locally compact groups with applications to weakly amenable groups

Abstract

We generalize the notion of an approximate indicator for a closed subgroup H of a locally compact group G introduced by Aristov, Runde, and Spronk and extend their characterization of the existence of such nets in terms of the approximability of H in an appropriate weak* topology. We find that this equivalent condition is satisfied whenever H is weakly amenable and H, considered as acting on 1(G) by multiplication, extends to a bounded map on VN(G). This occurs in particular when a natural projection VN(G)arrow I(A(G),H) exists. Applications are obtained to the existence (and non-existence) of natural and invariant projections onto I(A(G),H) and I(Acb(G),H) and to the existence of (-weak) bounded approximate identities in ideals of A(G) and Acb(G). In particular, we exhibit a locally compact group without the invariant complementation property.