Abstract
Existence, uniqueness, and regularity theory is developed for a general initial-boundary-value problem for a system of partial differential equations which describes the Biot consolidation model in poro-elasticity as well as a coupled quasi-static problem in thermoelasticity. Additional effects of secondary consolidation and pore fluid exposure on the boundary are included. This quasi-static system is resolved as an application of the theory of linear degenerate evolution equations in Hilbert space, and this leads to a precise description of the dynamics of the system. © 2000 Academic Press.
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Showalter, R. E. (2000). Diffusion in poro-elastic media. Journal of Mathematical Analysis and Applications, 251(1), 310–340. https://doi.org/10.1006/jmaa.2000.7048
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