AbstractThe ill-posedness of the Cauchy problem for the Biot system of equations in the case of energy dissipation is shown (the Cauchy problem does not have a unique solution)
Basic diffusion analytical solutions of one-dimensional consolidation are presented for the case of ...
An analytical theory is presented for the low-frequency behavior of dilatational waves propagating t...
International audienceAn extension of Biot's theory is proposed for frozen porous media where the so...
AbstractThe ill-posedness of the Cauchy problem for the Biot system of equations in the case of ener...
Wave propagation in porous media is of interest in various diversified areas of science and engineer...
We present a derivation of the equations describing wave propagation in porous media based upon an a...
We review main properties of acoustic waves which are described by continuous models of saturated po...
A theory of wave propagation in fractured porous media is presented based on the double-porosity con...
According to Biot's paper in 1956, by using the Lagrangian equations in classical mechanics, we cons...
This book presents the theory of waves propagation in a fluid-saturated porous medium (a Biot medium...
Propagation of the slow Biot wave is investigated within the low-frequency range. For the first time...
International audienceWe find a sufficient condition of hyperbolicity for a differential system gove...
Professeur Jacqueline Fleckinger, Toulouse I, Présidente du jury Professeur Bernard Hanouzet, Bordea...
Wave propagation in saturated porous media is investigated in the framework of two models, a theoret...
The squirt-flow wave attenuation mechanism is implemented in Biot's theory of poroelasticity in the ...
Basic diffusion analytical solutions of one-dimensional consolidation are presented for the case of ...
An analytical theory is presented for the low-frequency behavior of dilatational waves propagating t...
International audienceAn extension of Biot's theory is proposed for frozen porous media where the so...
AbstractThe ill-posedness of the Cauchy problem for the Biot system of equations in the case of ener...
Wave propagation in porous media is of interest in various diversified areas of science and engineer...
We present a derivation of the equations describing wave propagation in porous media based upon an a...
We review main properties of acoustic waves which are described by continuous models of saturated po...
A theory of wave propagation in fractured porous media is presented based on the double-porosity con...
According to Biot's paper in 1956, by using the Lagrangian equations in classical mechanics, we cons...
This book presents the theory of waves propagation in a fluid-saturated porous medium (a Biot medium...
Propagation of the slow Biot wave is investigated within the low-frequency range. For the first time...
International audienceWe find a sufficient condition of hyperbolicity for a differential system gove...
Professeur Jacqueline Fleckinger, Toulouse I, Présidente du jury Professeur Bernard Hanouzet, Bordea...
Wave propagation in saturated porous media is investigated in the framework of two models, a theoret...
The squirt-flow wave attenuation mechanism is implemented in Biot's theory of poroelasticity in the ...
Basic diffusion analytical solutions of one-dimensional consolidation are presented for the case of ...
An analytical theory is presented for the low-frequency behavior of dilatational waves propagating t...
International audienceAn extension of Biot's theory is proposed for frozen porous media where the so...
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