W. Kohler, G. Papanicolaou, and B. White. Localization and mode conversion for elastic waves in randomly layered media I. Wave motion, 23:1-22, 1996. Home/Search Document Details and Download
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Wave Propagation in Randomly Layered Media - Fouque (Correct)
.... use of diffusionapproximation and stationary phase theorems (see [5] A multimode situation is studied in [11] The reflected signal as well as the inverse problem in the 3 D layered case have been studied in the review paper [1] A generalization to elastic waves can be found in the recent paper [10] and the case where the medium is also slowly varying in the transverse directions is studied in [15] The generalization of the time reversal method to the 3 D layered case is a work in progress. ....
W. Kohler, G. Papanicolaou and B. White, Localization and Mode Conversion for Elastic Waves in Randomly Layered Media, Wave Motion, 23 (1996), pp. 1--22 and 181--201.
Reflection and Transmission of Acoustic Waves by a.. - Kohler, Papanicolaou.. (1998) Self-citation (Kohler Papanicolaou White) (Correct)
....realized in [15] The multiple scattering induced by the random layering created localization phenomena which profoundly affected the reflection and transmission properties of the slab. The O Doherty Anstey phenomenon was also shown to follow from a weak fluctuation variant of this model. In [17] we studied the reflection and transmission of elastic, time harmonic plane waves by randomly layered media, especially mode conversion by the inhomogeneities. In [18] we extended the statistical inverses theory for randomly layered media of [15] to the case of acoustic wave pulses generated by a ....
W. Kohler, G. Papanicolaou and B. White, Localization and Mode Conversion for Elastic Waves in Randomly Layered Media, Wave Motion 23, 1-22 and 181-201, 1996.
Mathematical Problems in Geophysical Wave Propagation - Papanicolaou Self-citation (Papanicolaou) (Correct)
....applications we must also consider elastic waves in randomly layered media. The analytical difficulties in extending the theory that we briefly described above to the elastic case are enormous, mainly because there are two wave modes, P and S waves, that are coupled by the inhomogeneities. In [56] we extended the scale separation asymptotic theory to time harmonic, obliquely incident elastic plane waves. We calculate in detail mode coupling in reflection and transmission, with various kinds of interfacial discontinuities. It is surprising that so many things can be calculated analytically ....
W. Kohler, G. Papanicolaou and B. White, Localization and mode conversion for elastic waves in randomly layered media I,II, Wave Motion, 23, pp. 1-22 and 181-201, 1996.
Multiscale Analysis of Well- and Seismic Data - Herrmann (1998) (Correct)
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W. Kohler, G. Papanicolaou, and B. White. Localization and mode conversion for elastic waves in randomly layered media I. Wave motion, 23:1-22, 1996.
Acoustic Pulses Propagating In Randomly Layered Media - Fouque (Correct)
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Kohler, W., Papanicolaou, G., and White, B. (1996) Localization and Mode Conversion for Elastic Waves in Randomly Layered Media, Wave Motion 23, 1-22 and 181-201.
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