Interacting continuous medium composed of an elastic solid and an incompressible newtonian fluid☆
References (29)
- et al.
A dynamic theory of interacting continua
Int. J. Engng Sci
(1965) - et al.
Constitutive equations for interacting continua
Int. J. Engng Sci
(1966) Incompressible mixture of Newtonian fluids
Int. J. Engng Sci
(1966)- et al.
On constitutive equations for flow of fluid through an elastic solid
Int. J. Engng Sci
(1966) - C. Truesdell and R. A. Toupin, The Classical Field Theories, Handbuch der Physik, Vol....
Mechanical basis of diffusion
J. chem. Phys
(1962)Non-linear diffusion
Phil. Trans. R. Soc
(1963)Non-linear diffusion
Phil. Trans. R. Soc
(1963)Non-linear diffusion
Phil. Trans. R. Soc
(1964)Diffusion of fluids through aeolotropic highly elastic solids
Archs. ration. Mech. Analysis
(1964)
A reacting continuum
Int. J. Engng Sci
(1964)
On axioms for heterogeneous continua
Z. angew. Math. Phys
(1966)
The Flow of Homogeneous Fluids Through Porous Media
(1937)
The Physics of Flow through Porous Media
(1960)
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1989, Developments in Geotechnical EngineeringMechanics of continuous porous media
1980, International Journal of Engineering SciencePlane Couette-Poiseuille flow past a homogeneous poroelastic layer
2013, Physics of FluidsPoroviscoelasticity of transversely isotropic cylinders
2009, Poromechanics IV - 4th Biot Conference on PoromechanicsPoroviscoelastic anisotropic solution for Mandel's problem
2005, Poromechanics III: Biot Centennial (1905-2005) - Proceedings of the 3rd Biot Conference on PoromechanicsPoroviscoelastic analysis of borehole and cylinder problems
1996, Acta Mechanica
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Part of this paper is taken from the Ph.D. thesis of the first author, submitted to Michigan State University.
Copyright © 1971 Published by Elsevier Ltd.