A Hilbert space approach to approximate diagonals for locally compact quantum groups

Abstract

For a locally compact quantum group G, the quantum group algebra L1(G) is operator amenable if and only if it has an operator bounded approximate diagonal. It is known that if L1(G) is operator biflat and has a bounded approximate identity then it is operator amenable. In this paper, we consider nets in L2(G) which suffice to show these two conditions and combine them to make an approximate diagonal of the form ωW'*η where W is the multiplicative unitary and η are simple tensors in L2(G) L2(G). Indeed, if G and G both have a bounded approximate identity and either of the corresponding nets in L2(G) satisfies a condition generalizing quasicentrality then this construction generates an operator bounded approximate diagonal. In the classical group case, this provides a new method for constructing approximate diagonals emphasizing the relation between the operator amenability of the group algebra L1(G) and the Fourier algebra A(G).