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Derivation of the state matrix for dynamic analysis of linear homogeneous media
S. R. Pride and S. Garambois, “ The role of Biot slow waves in electroseismic wave phenomena,” J. Acoust. Soc. Am. 111(2), 697–706 (2002).
J. M. Carcione, V. Grünhut, and A. Osella, “ Mathematical analogies in physics. Thin-layer wave theory,” Ann. Geophys. 57(1), 1–10 (2014).
J. P. Parra Martinez, O. Dazel, P. Göransson, and J. Cuenca, “ Acoustic analysis of anisotropic poroelastic multilayered systems,” J. Appl. Phys. 119(8), 084907 (2016).
Q. Serra, M. N. Ichchou, and J.-F. Deü, “ On the use of transfer approaches to predict the vibroacoustic response of poroelastic media,” J. Comput Acoust. 23, 1550020 (2015).
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A method to obtain the state matrix of an arbitrary linear homogeneous medium excited by a plane wave is proposed. The approach is based on projections on the eigenspace of the governing equations matrix. It is an alternative to manually obtaining a linearly independent set of equations by combining the governing equations. The resulting matrix has been validated against previously published derivations for an anisotropic poroelastic medium.
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