Harmonic analysis of a class of reproducing kernel Hilbert spaces arising from groups

Abstract

We study two extension problems, and their interconnections: (i) extension of positive definite (p.d.) continuous functions defined on subsets in locally compact groups G; and (ii) (in case of Lie groups G) representations of the associated Lie algebras La(G), i.e., representations of La(G) by unbounded skew-Hermitian operators acting in a reproducing kernel Hilbert space HF (RKHS). Our analysis is non-trivial even if G=Rn, and even if n=1. If G=Rn, (ii), we are concerned with finding systems of strongly commuting selfadjoint operators \ Ti\ extending a system of commuting Hermitian operators with common dense domain in HF. Specifically, we consider partially defined positive definite (p.d.) continuous functions F on a fixed group. From F we then build a reproducing kernel Hilbert space HF, and the operator extension problem is concerned with operators acting in HF, and with unitary representations of G acting on HF. Our emphasis is on the interplay between the two problems, and on the harmonic analysis of our RKHSs HF.