New boundaries for positive definite functions

Abstract

With view to applications in stochastic analysis and geometry, we introduce a new correspondence for positive definite kernels (p.d.) K and their associated reproducing kernel Hilbert spaces. With this we establish two kinds of factorizations: (i) Probabilistic: Starting with a positive definite kernel K we analyze associated Gaussian processes V. Properties of the Gaussian processes will be derived from certain factorizations of K, arising as a covariance kernel of V. (ii) Geometric analysis: We discuss families of measure spaces arising as boundaries for K. Our results entail an analysis of a partial order on families of p.d. kernels, a duality for operators and frames, optimization, Karhunen--Lo\`eve expansions, and factorizations. Applications include a new boundary analysis for the Drury-Arveson kernel, and for certain fractals arising as iterated function systems; and an identification of optimal feature spaces in machine learning models.