Abstract of the paper ``Generalized ray expansion for pulse propagation and attenuation in fluid-saturated porous media'' (with R. C. Y. Chin and G. W. Hedstrom)

A theory suitable for studying pulses propagating through a layered fluid-satruated porous medium is presented. Biot's theory is used to describe the constitutive equation of a fluid-saturated porous solid. Since fast and slow compressional waves exist in a Biot solid even at normal incidence, there is mode conversion at the interface and, therefore, the transmission and reflection coefficients are 2x2 matrices. We use matrix methods in developing the solution of the wave propagation problem. A generalized ray expansion algorithm is obtained by using the Gauss-Seidel matrix iterative method. The arrivals of the fast and slow waves are easily identified. A compact computational algorithm is developed using combinatorial analysis and the Cayley-Hamilton theorem.

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