Representations of p-convolution algebras on Lq-spaces

Abstract

For a nontrivial locally compact group G, and p∈ [1,∞), consider the Banach algebras of p-pseudofunctions, p-pseudomeasures, p-convolvers, and the full group Lp-operator algebra. We show that these Banach algebras are operator algebras if and only if p=2. More generally, we show that for q∈ [1,∞), these Banach algebras can be represented on an Lq-space if and only if one of the following holds: (a) p=2 and G is abelian; or (b) | 1p - 12|=| 1q - 12|. This result can be interpreted as follows: for p,q∈ [1,∞), the Lp- and Lq-representation theories of a group are incomparable, except in the trivial cases when they are equivalent. As an application, we show that, for distinct p,q∈ [1,∞), if the Lp and Lq crossed products of a topological dynamical system are isomorphic, then 1p + 1q=1. In order to prove this, we study the following relevant aspects of Lp-crossed products: existence of approximate identities, duality with respect to p, and existence of canonical isometric maps from group algebras into their multiplier algebras.