On inverse scattering in an elastic medium with vertical inhomogeneities
DOI10.1063/1.527160zbMath0592.73031OpenAlexW2083053621MaRDI QIDQ3721910
Publication date: 1986
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.527160
densityacoustic impedanceLamé parametersevanescent wavesvector wave equationhigh-frequency approximationinverse scattering techniquenonlinear inverse scattering problemelastic horizontally stratified mediumGelfand-Levitan theoremmode-converted shear wavesnormally incident compressional wavesset of two scalar wave equationsvertical inhomogeneities
Bulk waves in solid mechanics (74J10) Inhomogeneity in solid mechanics (74E05) Inverse problems for waves in solid mechanics (74J25)
Cites Work
- The Gelfand-Levitan, the Marchenko, and the Gopinath-Sondhi integral equations of inverse scattering theory, regarded in the context of inverse impulse-response problems
- The One-Dimensional Inverse Problem of Reflection Seismology
- Inverse scattering for the reflectivity function
- Computation of velocity and density profiles of acoustic media with vertical inhomogeneities using the method of characteristics applied to the slant stacked data
- Scattering techniques for a one dimensional inverse problem in geophysics
- On the elastic profiles of a layered medium from reflection data. Part I. Plane-wave sources
- Continuous and Discrete Inverse-Scattering Problems in a Stratified Elastic Medium. I. Plane Waves at Normal Incidence
This page was built for publication: On inverse scattering in an elastic medium with vertical inhomogeneities