Spectral theorems for positive algebra homomorphisms

Abstract

Let X be a locally compact Hausdorff space, let A be a partially ordered algebra, and let π C c(X) A be a positive algebra homomorphism. Under conditions on A that are satisfied in a good number of cases of practical interest, it is shown that π is represented by a unique regular spectral measure μ on the Borel σ-algebra of X, taking its values in the positive idempotents in A. The measure μ, which is σ-additive in an ordered sense, represents π via the order integral (a generalisation of the Lebesgue integral) that goes back to J.D.M. Wright and which was investigated earlier by the authors. The positive algebra homomorphism π can be extended from C c(X) to a positive linear map from the accompanying L1-space of μ into A. It is shown that, quite often, this L1-space is closed under multiplication, so that it is a vector lattice algebra, and that the extended map from L1 into A is not only an algebra homomorphism but, even when A is not a vector lattice, also a vector lattice homomorphism in a sense that is explained in the paper. When A has the countable sup property, the image of L1 (or of its positive cone) is described in terms of consecutive ups and downs of the image of C c(X) (or of its positive cone). The general results are applied in three different contexts, showing how various spectral theorems have a common order-theoretical root: representations on Banach lattices, on Hilbert spaces, and (the algebra need not consist of operators) spectral theory for JBW-algebras.