On the inverse elastic scattering by interfaces using one type of scattered waves
نویسندگان
چکیده
We deal with the problem of the linearized and isotropic elastic inverse scattering by interfaces. We prove that the scattered P -parts or S-parts of the far field pattern, corresponding to all the incident plane waves of pressure or shear types, uniquely determine the obstacles for both the penetrable and impenetrable obstacles. In the analysis, we assume only the Lipschitz regularity of the interfaces and, for the penetrable case, the Lamé coefficients to be measurable and bounded, inside the obstacles, with the usual jumps across these interfaces.
منابع مشابه
The factorization method for inverse elastic scattering from periodic structures
This paper is concerned with the inverse problem of scattering of time-harmonic elastic waves from rigid periodic structures. We establish the factorization method to identify an unknown diffraction grating profile (periodic surface) from knowledge of the scattered compressional or shear waves measured on a line above the periodic surface. Near-field operators are factorized by selecting approp...
متن کاملInverse wave scattering by unbounded obstacles: Uniqueness for the two-dimensional Helmholtz equation
In this paper we present some uniqueness results on inverse wave scattering by unbounded obstacles for the two-dimensional Helmholtz equation. We prove that an impenetrable one-dimensional rough surface can be uniquely determined by the values of the scattered field taken on a line segment above the surface that correspond to the incident waves generated by a countable number of point sources. ...
متن کاملDirect and Inverse Elastic Scattering Problems for Diffraction Gratings
This paper is concerned with the direct and inverse scattering of time-harmonic plane elastic waves by unbounded periodic structures (diffraction gratings). We present a variational approach to the forward scattering problems with Lipschitz grating profiles and give a survey of recent uniqueness and existence results. Concerning the inverse problem, global uniqueness results within the class of...
متن کاملScattering Attenuation of 2D Elastic Waves: Theory and Numerical Modeling Using a Wavelet-Based Method
The passage of seismic waves through highly heterogeneous media leads to significant scattering of seismic energy and an apparent attenuation of seismic signals emerging from the heterogeneous zone. The size of this scattering attenuation depends on the correlation properties of the medium, the rates of Pand S-wave velocities, and frequency content of the incident waves. An estimate of the effe...
متن کاملAn optimization method in inverse elastic scattering for one-dimensional grating profiles
Consider the inverse diffraction problem to determine a two-dimensional periodic structure from scattered elastic waves measured above the structure. We formulate the inverse problem as a least squares optimization problem, following the two-step algorithm by G. Bruckner and J. Elschner (2003 Inverse Problems 19 315-329) for electromagnetic diffraction gratings. Such a method is based on the Ki...
متن کامل