English

The Snapshot Problem for Wave Equations on Homogeneous Trees

Combinatorics 2025-12-23 v1

Abstract

By definition, a wave on a homogeneous tree X\mathfrak X is a solution to the discrete wave equation on X\mathfrak{X}; that is, a family {fk}kZ\{f_k\}_{k\in\mathbb Z} of complex-valued functions on X\mathfrak X satisfying the partial difference equation μ1fk=(fk+1+fk1)/2\mu_1 f_k=(f_{k+1}+f_{k-1})/2 for all kk, where μ1\mu_1 is the mean value operator on X\mathfrak X of radius 11. The function fkf_k is called the snapshot of the wave at time kk. For k2k\geq 2, we will show that there exist infinitely many waves having given snapshots at times 00 and kk, but that all such waves have the same snapshots at times which are multiples of kk. For integers 0<k<0<k<\ell, we then consider necessary and sufficient conditions for the existence and uniqueness of a wave with given snapshots at times 0,k,0,\,k,\,\ell.

Keywords

Cite

@article{arxiv.2512.19136,
  title  = {The Snapshot Problem for Wave Equations on Homogeneous Trees},
  author = {Fulton Gonzalez and Adelaide Nebeker and Katie Hallett and Andew Sailstad},
  journal= {arXiv preprint arXiv:2512.19136},
  year   = {2025}
}
R2 v1 2026-07-01T08:36:25.575Z