English

Totally positive kernels, Polya frequency functions, and their transforms

Functional Analysis 2023-09-27 v5 Classical Analysis and ODEs Rings and Algebras

Abstract

The composition operators preserving total non-negativity and total positivity for various classes of kernels are classified, following three themes. Letting a function act by post composition on kernels with arbitrary domains, it is shown that such a composition operator maps the set of totally non-negative kernels to itself if and only if the function is constant or linear, or just linear if it preserves total positivity. Symmetric kernels are also discussed, with a similar outcome. These classification results are a byproduct of two matrix-completion results and the second theme: an extension of A.M. Whitney's density theorem from finite domains to subsets of the real line. This extension is derived via a discrete convolution with modulated Gaussian kernels. The third theme consists of analyzing, with tools from harmonic analysis, the preservers of several families of totally non-negative and totally positive kernels with additional structure: continuous Hankel kernels on an interval, P\'olya frequency functions, and P\'olya frequency sequences. The rigid structure of post-composition transforms of totally positive kernels acting on infinite sets is obtained by combining several specialized situations settled in our present and earlier works.

Keywords

Cite

@article{arxiv.2006.16213,
  title  = {Totally positive kernels, Polya frequency functions, and their transforms},
  author = {Alexander Belton and Dominique Guillot and Apoorva Khare and Mihai Putinar},
  journal= {arXiv preprint arXiv:2006.16213},
  year   = {2023}
}

Comments

Final version, to appear in Journal d'Analyse Mathematique. 63 pages, 2 tables, no figures

R2 v1 2026-06-23T16:42:33.898Z