English

Nonuniform sampling, reproducing kernels, and the associated Hilbert spaces

Functional Analysis 2016-01-28 v1 Probability Spectral Theory

Abstract

In a general context of positive definite kernels kk, we develop tools and algorithms for sampling in reproducing kernel Hilbert space H\mathscr{H} (RKHS). With reference to these RKHSs, our results allow inference from samples; more precisely, reconstruction of an "entire" (or global) signal, a function ff from H\mathscr{H}, via generalized interpolation of ff from partial information obtained from carefully chosen distributions of sample points. We give necessary and sufficient conditions for configurations of point-masses δx\delta_{x} of sample-points xx to have finite norm relative to the particular RKHS H\mathscr{H} considered. When this is the case, and the kernel kk is given, we obtain an induced positive definite kernel δx,δyH\left\langle \delta_{x},\delta_{y}\right\rangle _{\mathscr{H}}. We perform a comparison, and we study when this induced positive definite kernel has l2l^{2} rows and columns. The latter task is accomplished with the use of certain symmetric pairs of operators in the two Hilbert spaces, l2l^{2} on one side, and the RKHS H\mathscr{H} on the other. A number of applications are given, including to infinite network systems, to graph Laplacians, to resistance metrics, and to sampling of Gaussian fields.

Keywords

Cite

@article{arxiv.1601.07380,
  title  = {Nonuniform sampling, reproducing kernels, and the associated Hilbert spaces},
  author = {Palle Jorgensen and Feng Tian},
  journal= {arXiv preprint arXiv:1601.07380},
  year   = {2016}
}

Comments

arXiv admin note: substantial text overlap with arXiv:1501.02310

R2 v1 2026-06-22T12:37:47.044Z