Application of Jacobi's Representation Theorem to locally multiplicatively convex topological real Algebras

Abstract

Let A be a commutative unital R-algebra and let be a seminorm on A which satisfies (ab)≤(a)(b). We apply T. Jacobi's representation theorem to determine the closure of a Σ A2d-module S of A in the topology induced by , for any integer d1. We show that this closure is exactly the set of all elements a∈ A such that α(a)0 for every -continuous R-algebra homomorphism α : A → R with α(S)⊂eq[0,∞), and that this result continues to hold when is replaced by any locally multiplicatively convex topology τ on A. We obtain a representation of any linear functional L : A → which is continuous with respect to any such or τ and non-negative on S as integration with respect to a unique Radon measure on the space of all real valued -algebra homomorphisms on A, and we characterize the support of the measure obtained in this way.