Discrete regularization and convergence of the inverse problem for 1+1 dimensional wave equation
Abstract
An inverse boundary value problem for the 1+1 dimensional wave equation (∂t2 - c(x)2 ∂x2)u(x,t)=0, x∈R+ is considered. We give a discrete regularization strategy to recover wave speed c(x) when we are given the boundary value of the wave, u(0,t), that is produced by a single pulse-like source. The regularization strategy gives an approximative wave speed c, satisfying a H\"older type estimate \| c-c\|≤ C εγ, where ε is the noise level.
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