Solution of the Basic Boundary Value Problems of Stationary Thermoelastic Oscillations for Domains Bounded by Spherical Surfaces
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L. Giorgashvili
Abstract
The boundary value problems of stationary thermoelastic oscillations are investigated for the entire space with a spherical cavity, when the limit values of a displacement vector and temperature or of a stress vector and heat flow are given on the boundary. Also, consideration is given to the boundary-contact problems when a nonhomogeneous medium fills up the entire space and consists of several homogeneous parts with spherical interface surfaces. Given on an interface surface are differences of the limit values of displacement and stress vectors, also of temperature and heat flow, while given on a free boundary are the limit values of a displacement vector and temperature or of a stress vector and heat flow. Solutions of the considered problems are represented as absolutely and uniformly convergent series.
© 1997 Plenum Publishing Corporation
Articles in the same Issue
- Singular Nonlinear (n – 1, 1) Conjugate Boundary Value Problems
- Generalizations of Non-Commutative Neutrix Convolution Products of Functions
- Solution of the Basic Boundary Value Problems of Stationary Thermoelastic Oscillations for Domains Bounded by Spherical Surfaces
- On Factorization and Partial Indices of Unitary Matrix-Functions of One Class
- The Uniform Norming of Retractions on Short Intervals for Certain Function Spaces
- On McEliece's Theorem
- On One Fredholm Integral Equation of Third Kind
- On Ito–Nisio Type Theorems for DS-Groups
Articles in the same Issue
- Singular Nonlinear (n – 1, 1) Conjugate Boundary Value Problems
- Generalizations of Non-Commutative Neutrix Convolution Products of Functions
- Solution of the Basic Boundary Value Problems of Stationary Thermoelastic Oscillations for Domains Bounded by Spherical Surfaces
- On Factorization and Partial Indices of Unitary Matrix-Functions of One Class
- The Uniform Norming of Retractions on Short Intervals for Certain Function Spaces
- On McEliece's Theorem
- On One Fredholm Integral Equation of Third Kind
- On Ito–Nisio Type Theorems for DS-Groups
