A layer-stripping solution of the inverse problem for a one-dimensional elastic medium

A fast algorithm for recovering profiles of density and Lame parameters as functions of depth for the inverse seismic problem in an elastic medium is obtained. The medium is probed with planar impulsive P- and SV-waves at oblique incidence, and the medium velocity components are measured at the surface. The interconversion of P- and SV-waves defines reflection coefficients from which the medium parameter profiles are obtained recursively. The algorithm works on a layer‐stripping principle, and it is specified in both differential and recursive forms. A physical interpretation of this procedure is given in terms of a lattice filter, where the first reflections of the downgoing waves in each layer yield the various reflection coefficients for that layer. A computer run of the algorithm on the synthetic impulsive plane‐wave responses of a twenty‐layer medium shows that the algorithm works satisfactorily.

[1]  E. A. Robinson Spectral approach to geophysical inversion by Lorentz, Fourier, and Radon transforms , 1982 .

[2]  A. S. Blagoveshchenskii The Inverse Problem in the Theory of Seismic Wave Propagation , 1967 .

[3]  J. Makhoul Stable and efficient lattice methods for linear prediction , 1977 .

[4]  B. Kennett,et al.  Seismic waves in a stratified half space. , 1979 .

[5]  J. R. Resnick,et al.  The inverse problem for the vocal tract: numerical methods, acoustical experiments, and speech synthesis. , 1983, The Journal of the Acoustical Society of America.

[6]  W. W. Symes The Inverse Reflection Problem for a Smoothly Stratified Elastic Medium. , 1979 .

[7]  John E. Markel,et al.  Linear Prediction of Speech , 1976, Communication and Cybernetics.

[8]  Alfred M. Bruckstein,et al.  Differential methods in inverse scattering , 1985 .

[9]  P. Schultz,et al.  Fundamentals of geophysical data processing , 1979 .

[10]  Kenneth P. Bube,et al.  The One-Dimensional Inverse Problem of Reflection Seismology , 1983 .

[11]  P. Dewilde,et al.  Inverse Scattering and Linear Prediction, the Time Continuous Case , 1981 .

[12]  J. Mendel,et al.  NON‐NORMAL INCIDENCE INVERSION: EXISTENCE OF SOLUTION* , 1983 .

[13]  C. Chapman Generalized Ray Theory for an Inhomogeneous Medium , 1974 .

[14]  Bernard C. Levy,et al.  The Schur algorithm and its applications , 1985 .

[15]  T. J. Clarke,et al.  Full reconstruction of a layered elastic medium from P-SV slant-stack data , 1984 .

[16]  Bernard C. Levy,et al.  Application of the Schur algorithm to the inverse problem for a layered acoustic medium , 1984 .

[17]  Shimon Coen On the elastic profiles of a layered medium from reflection data. Part I. Plane‐wave sources , 1981 .

[18]  Paul G. Richards,et al.  Quantitative Seismology: Theory and Methods , 1980 .