The Wave Trace and Birkhoff Billiards
Abstract
The purpose of this article is to develop a Hadamard-Riesz type parametrix for the wave propagator in bounded planar domains with smooth, strictly convex boundary. This parametrix then allows us to rederive an oscillatory integral representation for the wave trace appearing in \cite{MaMe82} and compute its principal symbol explicitly in terms of geometric data associated to the billiard map. This results in new formulas for the wave invariants. The order of the principal symbol, which appears to be inconsistent in the works of \cite{MaMe82} and \cite{Popov1994}, is also corrected. In those papers, the principal symbol was never actually computed and to our knowledge, this paper contains the first explicit formulas for the principal symbol of the wave trace. The wave trace formulas we provide are localized near both simple lengths corresponding to nondegenerate periodic orbits and degenerate lengths associated to one parameter families of periodic orbits tangent to a single rational caustic. Existence of a Hadamard-Riesz type parametrix with explicit symbol and phase calculations in the interior appears to be new in the literature, with the exception of the author's previous work \cite{Vig18} in the special case of elliptical domains. This allows us to circumvent the symbol calculus in \cite{DuGu75} and \cite{HeZe12} when computing trace formulas, which are instead derived from integrating our explicit parametrix over the diagonal.
Cite
@article{arxiv.1910.06441,
title = {The Wave Trace and Birkhoff Billiards},
author = {Amir Vig},
journal= {arXiv preprint arXiv:1910.06441},
year = {2022}
}
Comments
63 pages, 4 figures. The Hadamard variational formula approach has been replaced by a shorter infinitesimal version. The demonstration of 8 orbits near the diagonal of the boundary has been updated to include an exposition in the Friedlander model. References are updated and other minor errors corrected. The new version will appear in the Journal of Spectral Theory