Boundary value problems of steady vibrations in the theory of thermoelasticity for materials with a double porosity structure

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Authors

  • M. Svanadze Institute for Fundamental and Interdisciplinary Mathematics Research, Ilia State University, Georgia

Abstract

The purpose of the present paper is to develop the classical potential method in the linear theory of thermoelasticity for materials with a double porosity structure based on the mechanics of materials with voids. The fundamental solution of the system of equations of steady vibrations is constructed explicitly by means of elementary functions and its basic properties are established. The Sommerfeld-Kupradze type radiation conditions are established. The basic internal and external boundary value problems (BVPs) are formulated and the uniqueness theorems of these problems are proved. The basic properties of the surface (single-layer and double-layer) and volume potentials are established and finally, the existence theorems for regular (classical) solutions of the internal and external BVPs of steady vibrations are proved by using the potential method and the theory of singular integral equations.

Keywords:

thermoelasticity, double porosity, fundamental solution, steady vibrations, uniqueness and existence theorems