Inverse wave scattering in the time domain for point scatterers

Abstract

Let α,Y be the bounded from above self-adjoint realization in L2( R3) of the Laplacian with n point scatterers placed at Y=\y1,…,yn\⊂ R3, the parameters (α1,…αn)α∈ Rn being related to the scattering properties of the obstacles. Let uα,Yfε and ufε denote the solutions of the wave equations corresponding to α,Y and to the free Laplacian respectively, with a source term given by the pulse fε(x)=Σk=1Nfk\,ε(x-xk) supported in ε-neighborhoods of the points in XN=\x1,…, xN\, XN Y=. We show that, for any fixed λ>σ(α,Y), there exits N 1 such that the locations of the points in Y can be determined by the knowledge of the finite-dimensional scattering data operator FNλ: RN RN, N N, (FNλf)k:=ε 0∫0∞e-λ\,t(uα,Yfε(t,xk)-ufε(t,xk))\,dt\,. We exploit the factorized form of the resolvent difference (-α,Y+λ)-1-(-+λ)-1 and a variation on the finite-dimensional factorization in the MUSIC algorithm; multiple scattering effects are not neglected.