Gaussian beams and paraxial ray approximation in three-dimensional elastic inhomogeneous media

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Published: Jul 28, 1983
Keywords:
Seismic waves, 3D elastodynamic equation, Paraxial ray approximation, Riccati equation, Elastodynamic Gaussian beams

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Journal of Geophysics
Vol.65 (2023), ISSN 2643-9271
Journal of Geophysics
Vol.64 (2021-2022), ISSN 2643-9271
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Journal of Geophysics
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Journal of Geophysics
Vols.19-39 (1953-1973), ISSN 0044-2801
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V. Červeny
Institute of Geophysics, Charles University, Prague Czech Republic
I. Pšenčik
Geophysical Institute, Czech Academy of Sciences, Prague Czech Republic

Abstract

The elastodynamic Gaussian beams in 3D elastic inhomogeneous media are derived as asymptotic high-frequency one-way solutions of the elastodynamic equation concentrated close to rays of P and S waves. In this case, the elastodynamic equation is reduced to a parabolic (Schroedinger) equation which further leads to a matrix Riccati equation and the transport equation. Both these equations can be simply solved along the ray, the first numerically and the other analytically. The amplitude profile of the principal displacement component of the elastodynamic Gaussian beams is Gaussian in the plane perpendicular to the ray, with its maximum at the ray. The Gaussian beams are regular along the whole ray, even at caustics. As a limiting case of infinitely broad Gaussian beams, the paraxial ray approximation is obtained. The properties and possible applications of Gaussian beams and paraxial ray approximations in the numerical modelling of seismic wave fields in 3D inhomogeneous media are discussed.


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How to Cite
Červeny, V., & Pšenčik, I. (1983). Gaussian beams and paraxial ray approximation in three-dimensional elastic inhomogeneous media. Journal of Geophysics, 53(1), 1-15. Retrieved from https://journal.geophysicsjournal.com/JofG/article/view/142
Issue
Vol 53 No 1 (1983): Journal of Geophysics
Section
Research Articles
open

References
Aki, K., Richards, P. (1980) Quantitative seismology. Freeman, San Francisco

Arnaud, J.A., Kogelnik, H. (1969) Gaussian light beams with general astigmatism. Applied Optics 8, 1687-1693

Babich, V.M. (1968) Eigenfunctions, concentrated in the vicinity of closed geodesics. In: Babich, V.M. (Ed.) Mathematical problems of theory of propagation of waves 9:15-63. Nauka, Leningrad (in Russian)

Babich, V.M., Buldyrev, N.J. (1972) Asymptotic methods in problems of diffraction of short waves. Nauka, Moscow

Babich, V.M., Kirpichnikova, N.Y. (1979) The boundary layer method in diffraction problems. Springer, Berlin

Babich, V.M., Popov, M.M. (1981) Propagation of concentrated acoustical beams in three-dimensional inhomogeneous media. Akust. Zh. 27:828-835 (in Russian)

Born, M., Wolf, E. (1959) Principles of optics. Pergamon Press, New York

Červeny, V. (1983) Synthetic body wave seismograms for laterally varying layered structures by the Gaussian beam method. Geophys. J. R. Astron. Soc., 73:389-426

Červeny, V., Hron, F. (1980) The ray series method and dynamic ray tracing systems for 3D inhomogeneous media. Bull. Seismal. Soc. Am. 70:47-77

Červeny, V., Klimes, L., Pšenčik, I. (1982a) Synthetic seismic wave fields in 2D and 3D inhomogeneous structures. In: G. Pliva (Ed.) Proc. of the 27th Int. Geophysical Symposium, Bratislava 198, Vol. A(I), pp. 17-28. Brno: N.E. Geofyzika

Červeny, V., Molotkov, I.A., Pšenčik, I. (1977) Ray method in seismology. Charles University, Prague

Červeny, V., Popov, M.M., Pšenčik, I. (1982b) Computation of wave fields in inhomogeneous media - Gaussian beam approach. Geophys. J.R. Astron. Soc. 70:109-128

Červeny, V., Pšenčik, I. (1983) Gaussian beams in two-dimensional elast.ic inhomogeneous media. Geophys. J. R. Astron. Soc. 72:417-433

Hubral, P. (1979) A wave front curvature approach to computing ray amplitudes in inhomogeneous media with curved interfaces. Stud. Geophys. Geod. 23:131-137

Hubral, P. (1980) Wave front curvatures in 3 D laterally inhomogeneous media with curved interfaces. Geophysics 45:905-913

Kamke, E. (1959) Differentialgleichungen. Losungsmethoden und Losungen. Vol. 1, Gewohnliche Differentialgleichungen. Leipzig

Kirpichnikova, N.J. (1971) Construction of solutions concentrated close to rays for the equations of elasticity theory in an inhomogeneous isotropic space. In: Babich, V.M. (Ed.) Mathematical problems of theory of diffraction and propagation of waves, Vol. 1, pp. 103-113. Leningrad: Nauka (in Russian, English translation by American Mathematical Society, 1974)

Klimes, L. (1982a) Mathematical modelling of seismic wave fields in 3D laterally inhomogeneous media. Research Report No. 63, Institute of Geophysics, Charles University, Prague (in Czech)

Klimes, L. (1982b) Hermite-Gaussian beams in inhomogeneous elastic media. Studia Geophys. Geod. (In press)

Kravcov, Y.A., Orlov, Y.I. (1980) Geometrical optics of inhomogeneous media. Moscow: Nauka (in Russian)

Popov, M.M. (1982) Method of composition of Gaussian beams in isotropic theory of elasticity. Preprint LOMI AN SSSR, P-3-82, Leningrad

Popov, M.M., Pšenčik, I. (1978a) Ray amplitudes in inhomogeneous media with curved interfaces. In: Zatopek, A. (Ed.) Geofys. Sb., Vol. 24:111-129. Academia, Prague

Popov, M.M., Pšenčik, I. (1978b) Computation of ray amplitudes in inhomogeneous media with curved interfaces. Stud. Geophys. Geod. 22:248-258