Problems of steady vibrations in the coupled linear theory of double-porosity viscoelastic materials

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Authors

  • M.M. Svanadze Faculty of Exact and Natural Sciences, Tbilisi State University, Georgia

Abstract

In the present paper the coupled linear theory of double-porosity viscoelastic materials is considered and the basic boundary value problems (BVPs) of steady vibrations are investigated. Indeed, in the beginning, the systems of equations of motion and steady vibrations are presented. Then, Green’s identities are established and the uniqueness theorems for classical solutions of the BVPs of steady vibrations are proved. The fundamental solution of the system of steady vibration equations is constructed and the basic properties of the potentials (surface and volume) are given. Finally, the existence theorems for classical solutions of the above mentioned BVPs are proved by using the potential method (the boundary integral equations method) and the theory of singular integral equations.

Keywords:

viscoelasticity, double-porosity materials, uniqueness and existence theorems, potential method.