Mathematical theory of elasticity
著者
書誌事項
Mathematical theory of elasticity
CRC Press, c2011
2nd ed
- : hbk
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注記
Includes bibliographical references and indexes
内容説明・目次
内容説明
Through its inclusion of specific applications, The Mathematical Theory of Elasticity, Second Edition continues to provide a bridge between the theory and applications of elasticity. It presents classical as well as more recent results, including those obtained by the authors and their colleagues. Revised and improved, this edition incorporates additional examples and the latest research results.
New to the Second Edition
Exposition of the application of Laplace transforms, the Dirac delta function, and the Heaviside function
Presentation of the Cherkaev, Lurie, and Milton (CLM) stress invariance theorem that is widely used to determine the effective moduli of elastic composites
The Cauchy relations in elasticity
A body force analogy for the transient thermal stresses
A three-part table of Laplace transforms
An appendix that explores recent developments in thermoelasticity
Although emphasis is placed on the problems of elastodynamics and thermoelastodynamics, the text also covers elastostatics and thermoelastostatics. It discusses the fundamentals of linear elasticity and applications, including kinematics, motion and equilibrium, constitutive relations, formulation of problems, and variational principles. It also explains how to solve various boundary value problems of one, two, and three dimensions.
This professional reference includes access to a solutions manual for those wishing to adopt the book for instructional purposes.
目次
Historical Note, Theory, Examples, and Problems: Creators of the Theory of Elasticity. Mathematical Preliminaries. Fundamentals of Linear Elasticity. Formulation of Problems of Elasticity. Variational Formulation of Elastostatics. Variational Principles of Elastodynamics. Complete Solutions of Elasticity. Formulation of Two-Dimensional Problems. Applications and Problems: Solutions to Particular Three-Dimensional Boundary Value Problems of Elastostatics. Solutions to Particular Two-Dimensional Boundary Value Problems of Elastostatics. Solutions to Particular Three-Dimensional Initial-Boundary Value Problems of Elastodynamics. Solutions to Particular Two-Dimensional Initial-Boundary Value Problems of Elastodynamics. One-Dimensional Solutions of Elastodynamics. Appendix. Indices.
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