On vector-valued characters for noncommutative function algebras

Abstract: Let A be a closed subalgebra of a C*-algebra, that is a closed algebra of Hilbert space operators. We generalize to such operator algebras $A$ several key theorems and concepts from the theory of classical function algebras. In particular we consider several problems that arise when generalizing classical function algebra results involving characters ((contractive) homomorphisms into the scalars) on the algebra. For example, the Jensen inequality, the related Bishop-Ito-Schreiber theorem, and the theory of Gleason parts. We will usually replace characters (classical function algebra case) by D-characters, certain completely contractive homomorphisms $\Phi : A \to D$, where D is a C*-subalgebra of A. We also consider some D-valued variants of the classical Gleason-Whitney theorem.