Hyperbolic Fourier series
Analysis of PDEs
2023-07-06 v2
Abstract
In this article we explain the essence of the interrelation described in [PNAS 118, 15 (2021)] on how to write explicit interpolation formula for solutions of the Klein-Gordon equation by using the recent Fourier pair interpolation formula of Viazovska and Radchenko from [Publ Math-Paris 129, 1 (2019)]. We construct explicitly the sequence in which is biorthogonal to the system , , , , and show that it is complete in . We associate with each its hyperbolic Fourier series and prove that it converges to in the space of tempered distributions on the real line. Applied to the above mentioned biorthogonal system, the integral transform given by , for and , supplies interpolating functions for the Klein-Gordon equation.
Keywords
Cite
@article{arxiv.2110.00148,
title = {Hyperbolic Fourier series},
author = {Andrew Bakan and Haakan Hedenmalm and Alfonso Montes-Rodriguez and Danylo Radchenko and Maryna Viazovska},
journal= {arXiv preprint arXiv:2110.00148},
year = {2023}
}
Comments
123 pages, 3 figures