Positive representations of C0(X). I

Abstract

We introduce the notion of a positive spectral measure on a σ-algebra, taking values in the positive projections on a Banach lattice. Such a measure generates a bounded positive representation of the bounded measurable functions. If X is a locally compact Hausdorff space, and π is a positive representation of C0(X) on a KB-space, then π is the restriction to C0(X) of such a representation generated by a unique regular positive spectral measure on the Borel σ-algebra of X. The relation between a positive representation of C0(X) on a Banach lattice and -- if it exists -- a generating positive spectral measure on the Borel σ-algebra is further investigated; here and elsewhere phenomena occur that are specific for the ordered context.