Factorization of positive definite kernels. Correspondences: C*-algebraic and operator valued context vs scalar valued kernels

Abstract

We introduce and study a class M of generalized positive definite kernels of the form K X× X L(A,L(H)), where A is a unital C*-algebra and H a Hilbert space. These kernels encode operator-valued correlations governed by the algebraic structure of A, and generalize classical scalar-valued positive definite kernels, completely positive (CP) maps, and states on C*-algebras. Our approach is based on a scalar-valued kernel K(X×A× H)2 associated to K, which defines a reproducing kernel Hilbert space (RKHS) and enables a concrete, representation-theoretic analysis of the structure of such kernels. We show that every K∈M admits a Stinespring-type factorization K(s,t)(a)=V(s)*π(a)V(t). In analogy with the Radon--Nikodym theory for CP maps, we characterize kernel domination K≤ L in terms of a positive operator A∈πL(A)' satisfying K(s,t)(a)=VL(s)*πL(a)AVL(t). We further show that when πL is irreducible, domination implies scalar proportionality, thus recovering the classical correspondence between pure states and irreducible representations.