The H\"ormander--Bernhardsson extremal function

Abstract

We characterize the function of minimal L1 norm among all functions f of exponential type at most π for which f(0)=1. This function, studied by H\"ormander and Bernhardsson in 1993, has only real zeros τn, n=1,2, …. Starting from the fact that n+12-τn is an 2 sequence, established in an earlier paper of ours, we identify in the following way. We factor (z) as (z)(-z), where (z)= Πn=1∞(1+(-1)nzτn) and show that satisfies a certain second order linear differential equation along with a functional equation either of which characterizes . We use these facts to establish an odd power series expansion of n+12-τn in terms of (n+12)-1 and a power series expansion of the Fourier transform of , as suggested by the numerical work of H\"ormander and Bernhardsson. The dual characterization of 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.

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