Admissibility of H\"ormander--Bernhardsson extremal zeros

Abstract

Let be the H\"ormander--Bernhardsson extremal function, and let (τn)n1 be its real zeros. Using the recent analytic description of the zero set τn, we prove that the squared zeros λn=τn2 form an admissible sequence in the sense of Quine--Heydari--Song: the heat trace (t)=Σn1e-λn t has a full t0+ expansion in pure powers of t1/2. The proof is based on an analytic normal form \[ λn=(n+12)2+q!((n+12)-2), \] a uniform Taylor expansion in t, and a Mellin--Hurwitz zeta analysis of the resulting weighted Gaussian sums. As applications we obtain meromorphic continuation and special-value information for the associated spectral zeta function and zeta-regularized product, sharp large-parameter asymptotics for the canonical product Πn(1+z/λn). In particular, we deduce the conjecture by Bondarenko--Ortega-Cerd\`a--Radchenko--Seip for the special values of the Dirichlet-type series attached to . We also establish a parity dichotomy: sequences (τnm) are QHS--admissible for even m, while for odd m a nonzero t t term obstructs admissibility.