Group algebras acting on Lp-spaces

Abstract

For p∈ [1,∞) we study representations of a locally compact group G on Lp-spaces and QSLp-spaces. The universal completions Fp(G) and FpQS(G) of L1(G) with respect to these classes of representations (which were first considered by Phillips and Runde, respectively), can be regarded as analogs of the full group of G (which is the case p=2). We study these completions of L1(G) in relation to the algebra Fpλ(G) of p-pseudofunctions. We prove a characterization of group amenability in terms of certain canonical maps between these universal Banach algebras. In particular, G is amenable if and only if FpQS(G)=Fp(G)=Fpλ(G). One of our main results is that for 1≤ p< q≤ 2, there is a canonical map γp,q Fp(G) Fq(G) which is contractive and has dense range. When G is amenable, γp,q is injective, and it is never surjective unless G is finite. We use the maps γp,q to show that when G is discrete, all (or one) of the universal completions of L1(G) are amenable as a Banach algebras if and only if G is amenable. Finally, we exhibit a family of examples showing that the characterizations of group amenability mentioned above cannot be extended to Lp-operator crossed products of topological spaces.