Economic numerical method of solving coefficient inverse problem for 3D wave equation (1703.01216v1)

Abstract: An inverse problem of acoustic sounding is under consideration in a form of 3D inverse coefficient problem for wave equation. Unknown coefficient is the local propagation velocity of vibrations, which is associated with inhomogeneities of the medium. We are looking for this coefficient, knowing special time integrals of the scattered wave field. In the article, a new linear 3D Fredholm integral equation of the first kind is introduced, of which it is possible to find the unknown coefficient from these time integrals. We present and substantiate a numerical algorithm for solving this integral equation. The algorithm does not require large computational resources and big-time implementation. It is based on the use of fast Fourier transform under some a priori assumptions about unknown coefficient and observation region of the scattered field. Typical results of solving this 3D inverse problem on a personal computer for simulated data demonstrate the capabilities of the proposed algorithm.