On Exponential Instability of an Inverse Problem for the Wave Equation

Abstract

For a time-independent potential q∈ L∞, consider the source-to-solution operator that maps a source f to the solution u=u(t,x) of (+q)u=f in Euclidean space with an obstacle, where we impose on u vanishing Cauchy data at t=0 and vanishing Dirichlet data at the boundary of the obstacle. We study the inverse problem of recovering the potential q from this source-to-solution map restricted to some measurement domain. By giving an example where measurements take place in some subset and the support of q lies in the `shadow region' of the obstacle, we show that recovery of q is exponentially unstable.