Regularization strategy for inverse problem for 1+1 dimensional wave equation

Abstract

An inverse boundary value problem for a 1+1 dimensional wave equation with wave speed c(x) is considered. We give a regularisation strategy for inverting the map A:c , where is the hyperbolic Neumann-to-Dirichlet map corresponding to the wave speed c. More precisely, we consider the case when we are given a perturbation of the Neumann-to-Dirichlet map = + E , where E corresponds to the measurement errors, and reconstruct an approximate wave speed c. We emphasize that may not not be in the range of the map A. We show that the reconstructed wave speed c satisfies \| c-c\|L∞<C \|E\|1/18. Our regularization strategy is based on a new formula to compute c from .