English

The Snapshot Problem for the Wave equation

Analysis of PDEs 2023-08-24 v1

Abstract

By definition, a wave is a CC^\infty solution u(x,t)u(x,t) of the wave equation on Rn\mathbb R^n, and a snapshot of the wave uu at time tt is the function utu_t on Rn\mathbb R^n given by ut(x)=u(x,t)u_t(x)=u(x,t). We show that there are infinitely many waves with given CC^\infty snapshots f0f_0 and f1f_1 at times t=0t=0 and t=1t=1 respectively, but that all such waves have the same snapshots at integer times. We present a necessary condition for the uniqueness, and a compatibility condition for the existence, of a wave uu to have three given snapshots at three different times, and we show how this compatibility condition leads to the problem of small denominators and Liouville numbers. We extend our results to shifted wave equations on noncompact symmetric spaces. Finally, we consider the two-snapshot problem and corresponding small denominator results for the shifted wave equation on the nn-sphere.

Keywords

Cite

@article{arxiv.2308.12208,
  title  = {The Snapshot Problem for the Wave equation},
  author = {Fulton Gonzalez and Tomoyuki Kakehi and Jens Christensen and Jue Wang},
  journal= {arXiv preprint arXiv:2308.12208},
  year   = {2023}
}

Comments

47 pages

R2 v1 2026-06-28T12:02:37.159Z