English

Point evaluation in Paley--Wiener spaces

Classical Analysis and ODEs 2024-10-02 v4 Complex Variables Functional Analysis

Abstract

We study the norm of point evaluation at the origin in the Paley--Wiener space PWpPW^p for 0<p<0 < p < \infty, i. e., we search for the smallest positive constant CC, called Cp\mathscr{C}_p, such that the inequality f(0)pCfpp|f(0)|^p \leq C \|f\|_p^p holds for every ff in PWpPW^p. We present evidence and prove several results supporting the following monotonicity conjecture: The function pCp/pp\mapsto \mathscr{C}_p/p is strictly decreasing on the half-line (0,)(0,\infty). Our main result implies that Cp<p/2\mathscr{C}_p <p/2 for 2<p<2<p<\infty, and we verify numerically that Cp>p/2\mathscr{C}_p > p/2 for 1p<21 \leq p < 2. We also estimate the asymptotic behavior of Cp\mathscr{C}_p as pp \to \infty and as p0+p \to 0^+. Our approach is based on expressing Cp\mathscr{C}_p as the solution of an extremal problem. Extremal functions exist for all 0<p<0<p<\infty; they are real entire functions with only real zeros, and the extremal functions are known to be unique for 1p<1\leq p < \infty. Following work of H\"{o}rmander and Bernhardsson, we rely on certain orthogonality relations associated with the zeros of extremal functions, along with certain integral formulas representing respectively extremal functions and general functions at the origin. We also use precise numerical estimates for the largest eigenvalue of the Landau--Pollak--Slepian operator of time--frequency concentration. A number of qualitative and quantitative results on the distribution of the zeros of extremal functions are established. In the range 1<p<1<p<\infty, the orthogonality relations associated with the zeros of the extremal function are linked to a de Branges space. We state a number of conjectures and further open problems pertaining to Cp\mathscr{C}_p and the extremal functions.

Keywords

Cite

@article{arxiv.2210.13922,
  title  = {Point evaluation in Paley--Wiener spaces},
  author = {Ole Fredrik Brevig and Andrés Chirre and Joaquim Ortega-Cerdà and Kristian Seip},
  journal= {arXiv preprint arXiv:2210.13922},
  year   = {2024}
}

Comments

Minor corrections to Theorem 1.4 and Lemma 3.1. This paper has been accepted for publication in Journal d'Analyse Math\'{e}matique

R2 v1 2026-06-28T04:27:15.076Z