Explicit inversion for variable-speed wave equations on bounded domains

Abstract

We study the reconstruction of the initial pressure f(x)=p(x,0) for the wave model \[ ∂t2 p(x,t)=c(x)xp(x,t) (x,t)∈×[0,∞), \] posed on a bounded domain with variable sound speed c(·). From time-resolved boundary measurements, we consider two settings: (i) measurement of p|∂×[0,∞) under a Robin boundary condition p+α\,∂ p=0 on ∂×[0,∞) with α 0, and (ii) measurement of ∂ p|∂×[0,∞) under a Dirichlet boundary condition p=0 on ∂×[0,∞). Within a unified framework, we present explicit formulas that recover the spectral coefficients f,φkB of f with respect to the eigenfunction bases of the operator -c(·)x for boundary types B∈\D,R\. The framework integrates variable sound speed with Dirichlet/Robin boundary conditions in a single setting, enabling direct coefficient-level recovery from boundary data.