Mechanics of the continuous environment issues : dedicated to the 120th birth anniversary of academician Nikoloz Muskhelishvili / Ivane Gorgidze, editor.
Material type:![Text](/opac-tmpl/lib/famfamfam/BK.png)
- text
- computer
- online resource
- 9781621006701
- 1621006700
- Muskhelishvili, N. I. (Nikolaĭ Ivanovich), 1891-1976
- Muskhelishvili, N. I. (Nikolaĭ Ivanovich), 1891-1976
- Differential equations, Partial
- Boundary value problems
- Elasticity
- Elasticity
- Équations aux dérivées partielles
- Problèmes aux limites
- Élasticité
- MATHEMATICS -- Differential Equations -- Partial
- Boundary value problems
- Differential equations, Partial
- Elasticity
- 515/.353 23
- QA431
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OPJGU Sonepat- Campus | E-Books EBSCO | Available |
Includes bibliographical references and index.
Description based on print version record.
MECHANICS OF THE CONTINUOUS ENVIRONMENT ISSUES: DEDICATED TO THE 120TH BIRTH ANNIVERSARY OF ACADEMICIAN NIKOLOZ MUSKHELISHVILI; MECHANICS OF THE CONTINUOUS ENVIRONMENT ISSUES DEDICATED TO THE 120TH BIRTH ANNIVERSARY OF ACADEMICIAN NIKOLOZ MUSKHELISHVILI; LIBRARY OF CONGRESS CATALOGING-IN-PUBLICATION DATA; CONTENTS; PREFACE; Chapter 1: IN TIME NON-LOCAL PROBLEMSFOR PLURI-PARABOLIC EQUATIONS; Abstract; 1. Introduction; 2. Statement of the Problem; 3. Uniqueness Issue; 4. The Iteration Process; Acknowledgments; References.
Chapter 2: ON CONSTRUCTION AND JUSTIFICATION OF SYSTEMS OF VON KARMAN-REISSNER TYPE FOR BINARY MIXTURE, POROUS ELASTIC PLATES AND PIEZO-ELECTRIC AND ELECTRICALLY CONDUCTIVE CONTINUUM MEDIAAbstract; Introduction; I. The Principle System of Three-Dimensional Equationswith Respect to Spatial Variables for Binary Mixtures; II. Von Karman-Reissner Type Two-DimensionalEquations with Respect to Spatial Variablesfor Binary Mixtures; III. Some Two-Dim Models for Poro-Elastic AnisotropicPlates; IV. Refined Theories for Piezo-Electric and ElacricallyConductive Elastic Plates; V. Historical Excursus.
5. Potentials and Their Properties6. Existence Theorems; Acknowledgement; References; Chapter 8: NO CLASSICAL STATIONARY OSCILLATION PROBLEMS OF THERMO ELASTICITY FOR A BALL AND AN INFINITE DOMAIN WITH A SPHERICAL CAVITY; Abstract; 1. Introduction; 2. Some Important Formulas and Theorems; 3. Statement of the Problem. The Uniqueness Theorems; 4. Solution of the Boundary Value Problems; References; Chapter 9: A BOUNDARY CONTACT PROBLEM OF STATIONARY OSCILLATIONS OF THE ELASTIC MIXTURE THEORY FOR A DOMAIN BOUNDED BY A SPHERICAL SURFACE; Abstract; 1. Introduction.
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