The Snapshot Problem for Wave Equations on Homogeneous Trees

Abstract

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

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