English

The H\"{o}rmander--Bernhardsson extremal function

Classical Analysis and ODEs 2026-01-26 v2 Complex Variables Functional Analysis

Abstract

We characterize the function φ\varphi of minimal L1L^1 norm among all functions ff of exponential type at most π\pi for which f(0)=1f(0)=1. This function, studied by H\"{o}rmander and Bernhardsson in 1993, has only real zeros ±τn\pm \tau_n, n=1,2,n=1,2, \ldots. Starting from the fact that n+12τnn+\frac12-\tau_n is an 2\ell^2 sequence, established in an earlier paper of ours, we identify φ\varphi in the following way. We factor φ(z)\varphi(z) as Φ(z)Φ(z)\Phi(z)\Phi(-z), where Φ(z)=n=1(1+(1)nzτn)\Phi(z)= \prod_{n=1}^\infty(1+(-1)^n\frac{z}{\tau_n}) and show that Φ\Phi satisfies a certain second order linear differential equation along with a functional equation either of which characterizes Φ\Phi. We use these facts to establish an odd power series expansion of n+12τnn+\frac12-\tau_n in terms of (n+12)1(n+\frac12)^{-1} and a power series expansion of the Fourier transform of φ\varphi, as suggested by the numerical work of H\"{o}rmander and Bernhardsson. The dual characterization of Φ\Phi arises from a commutation relation that holds more generally for a two-parameter family of differential operators, a fact that is used to perform high precision numerical computations.

Keywords

Cite

@article{arxiv.2504.05205,
  title  = {The H\"{o}rmander--Bernhardsson extremal function},
  author = {Andriy Bondarenko and Joaquim Ortega-Cerdà and Danylo Radchenko and Kristian Seip},
  journal= {arXiv preprint arXiv:2504.05205},
  year   = {2026}
}

Comments

Some typos corrected. The paper will appear in Acta Mathematica

R2 v1 2026-06-28T22:49:37.663Z