Extending representations of Banach algebras to their biduals

Abstract

We show that a representation of a Banach algebra A on a Banach space X can be extended to a canonical representation of A** on X if and only if certain orbit maps A X are weakly compact. When this is the case, we show that the essential space of the representation is complemented if A has a bounded left approximate identity. This provides a tool to disregard the difference between degenerate and nondegenerate representations. Our results have interesting consequences both in C*-algebras and in abstract harmonic analysis. For example, a C*-algebra A has an isometric representation on an Lp-space, for p∈[1,∞)\2\, if and only if A is commutative. Moreover, the Lp-operator algebra of a locally compact group is universal with respect to arbitrary representations on Lp-spaces.