Abstract
The problem of reconstruction of an unknown refractive index n(x) of an inhomogeneous solid P is considered. The refractive index is assumed to be a piecewise-Holder function. The original boundary value problem for the Helmholtz equation is reduced to the integral Lippmann-Schwinger equation. The incident wave is defined by a point source located outside P. The solution of the inverse problem is obtained in two steps. First, the “current” \( J = (k^2 - k_0^2)u\) is determined in the inhomogeneity region. Second, the function k(x) is expressed via the current J and the incident wave \(u_0.\) The uniqueness of the solution J to the first-kind integral equation is proved in the class of piecewise-constant functions. The two-step method is verified by solving a test problem with a given refractive index. The comparison between the approximate solutions and the exact one approved the efficiency of the proposed method.
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