This paper concerns with the coupled linear dynamical theory of elasticity for solids with double porosity. Basic properties of plane harmonic waves are established. Radiation conditions of regular vectors are given. Basic internal and external boundary value problems (BVPs) of steady vibrations are formulated, and finally, uniqueness theorems for regular (classical) solutions of these BVPs are proved
We consider a coupled system of mixed hyperbolic-parabolic type which describes the Biot consolidati...
Exact formulae for the determination of the space dimensionality for solutions of main boundary-valu...
Existence, uniqueness, and regularity theory is developed for a general initial-boundary-value probl...
This paper concerns with the coupled linear dynamical theory of elasticity for solids with double po...
This paper discusses the full coupled linear theory of elasticity for solids with double porosity. T...
The present paper concerns with the linear theory of micropolar thermoelasticity for materials with ...
In this article, the linear theory of thermoelasticity for solids with double porosity is considered...
AbstractIn the present work we formulate uniqueness theorems for the problem of propagation of longi...
The linear theory of thermoelastic materials with a double porosity structure is considered. In the...
The basic two-dimensional boundary value problems of the fully coupled linear equilibrium theory of ...
In the context of the linear theory of homogeneous and isotropic elastic materials with voids, an in...
In this paper we present inhomogeneous plane wave solutions within the context of linear theory of p...
Abstract: We consider boundary value problems of anti-plane shear in the static theory of linear pie...
© 2019, Springer Science+Business Media, LLC, part of Springer Nature. We discuss boundary-value pro...
In the context of a well known theory for porous elastic materials, some theorems of uniqueness and ...
We consider a coupled system of mixed hyperbolic-parabolic type which describes the Biot consolidati...
Exact formulae for the determination of the space dimensionality for solutions of main boundary-valu...
Existence, uniqueness, and regularity theory is developed for a general initial-boundary-value probl...
This paper concerns with the coupled linear dynamical theory of elasticity for solids with double po...
This paper discusses the full coupled linear theory of elasticity for solids with double porosity. T...
The present paper concerns with the linear theory of micropolar thermoelasticity for materials with ...
In this article, the linear theory of thermoelasticity for solids with double porosity is considered...
AbstractIn the present work we formulate uniqueness theorems for the problem of propagation of longi...
The linear theory of thermoelastic materials with a double porosity structure is considered. In the...
The basic two-dimensional boundary value problems of the fully coupled linear equilibrium theory of ...
In the context of the linear theory of homogeneous and isotropic elastic materials with voids, an in...
In this paper we present inhomogeneous plane wave solutions within the context of linear theory of p...
Abstract: We consider boundary value problems of anti-plane shear in the static theory of linear pie...
© 2019, Springer Science+Business Media, LLC, part of Springer Nature. We discuss boundary-value pro...
In the context of a well known theory for porous elastic materials, some theorems of uniqueness and ...
We consider a coupled system of mixed hyperbolic-parabolic type which describes the Biot consolidati...
Exact formulae for the determination of the space dimensionality for solutions of main boundary-valu...
Existence, uniqueness, and regularity theory is developed for a general initial-boundary-value probl...