Harmonic Analysis of a Class of Reproducing Kernel Hilbert Spaces Arising from Groups

Palle E.T. Jorgensen, Steen Pedersen, Feng Tian

Research output: Working paperPreprint

Abstract

We study two extension problems, and their interconnections: (i) extension of positive definite 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 H-F (RKHS). Our analysis is non-trivial even if G = R-n, and even if n = 1. If G = R-n, (ii), we are concerned with finding systems of strongly commuting selfadjoint operators {T-i} extending a system of commuting Hermitian operators with common dense domain in H-F.

Our general results include non-compact and non-Abelian Lie groups, where the study of unitary representations in H-F is subtle.

Original languageEnglish
PublisherarXiv
Pages157-197
Number of pages41
DOIs
StatePublished - 2015

ASJC Scopus Subject Areas

  • General Mathematics

Keywords

  • Boundary values
  • Convex
  • Deficiency-indices
  • Friedrichs extension
  • Green’s function
  • Harmonic decompositions
  • Hilbert space
  • Partial differential operators
  • Potentials
  • Quantum measurement
  • Rank-one perturbation
  • Renormalization
  • Representations of Lie groups
  • Reproducing kernels
  • Stochastic processes
  • Unbounded operators
  • Unitary one-parameter group

Disciplines

  • Applied Mathematics
  • Applied Statistics
  • Mathematics

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