《張量分析及其在力學中的套用》是2015年世界圖書出版公司出版的著作,作者是[俄] L.P.樂博德夫(Leonid P.Lebedev),[俄] Michael J Cloud,[俄] Victor A Eremeyev。
基本介紹
- 中文名:《張量分析及其在力學中的套用》
- 作者:[俄]L.P.樂博德夫(Leonid P.Lebedev),[俄]Michael J Cloud,[俄]Victor A Eremeyev
- 出版社:世界圖書出版公司
- 出版時間:2015年01月01日
- ISBN:9787510084539
內容簡介,目錄,
內容簡介
《張量分析及其在力學中的套用》張量分析是研究連續介質力學的重要數學工具。張量分析及其在連續介質力學中的套用緊密結合工程力學來介紹張量分析的基本理論和實用計算。《張量分析及其在力學中的套用》共分七章,內容包括:矢量與張量,笛卡爾張量,張量場論,張量場函式的導數,張量分析線上彈性理論中的套用,張量分析在流體力學中的套用。
目錄
Foreword
Preface
Tensor Analysis
1.Preliminaries
1.1 The Vector Concept Revisited
1.2 A First Look at Tensors
1.3 Assumed Background
1.4 More on the Notion of a Vector
1.5 Problems
2.Transformations and Vectors
2.1 Change of Basis
2.2 Dual Bases
2.3 Transformation to the Reciprocal Frame
2.4 Transformation Between General Frames
2.5 Covariant and Contravariant Components
2.6 The Cross Product in Index Notation
2.7 Norms on the Space of Vectors
2.8 Closing Remarks
2.9 Problems
3.Tensors
3.1 Dyadic Quantities and Tensors
3.2 Tensors From an Operator Viewpoint
3.3 Dyadic Components Under Transformation
3.4 More Dyadic Operations
3.5 Properties of Second—Order Tensors
3.6 Eigenvalues and Eigenvectors of a Second—Order Symmel ricTensor
3.7 The Cayley—Hamilton Theorem
3.8 Other Properties of Second—Order Tensors
3.9 Extending the Dyad Idea
3.10 Tensors of the Fourth and Higher Orders
3.11 Functions of Tensorial Arguments
3.12 Norms for Tensors, and Some Spaces
3.13 Differentiation of Tensorial Functions
3.14 Problems
4.Tensor Fields
4.1 Vector Fields
4.2 Differentials and the Nabla Operator
4.3 Differentiation of a Vector Function
4.4 Derivatives of the Frame Vectors
4.5 Christoffel Coefficients and their Properties
4.6 Covariant Differentiation
4.7 Covariant Derivative of a Second—Order Tensor
4.8 Differential Operations
4.9 Orthogonal Coordinate Systems
4.10 Some Formulas oflntegration
4.11 Problems
5.Elements of Differential Geometry
5.1 Elementary Facts from the Theory of Curves
5.2 The Torsion of a Curve
5.3 Frenet—Serret Equations
5.4 Elements of the Theory of Surfaces
5.5 The Second Fundamental Form of a Surface
5.6 Derivation Formulas
5.7 Implicit R,epresentation of a Curve; Contact of Curves
5.8 Osculating Paraboloid
5.9 The Principal Curvatures of a Surface
5.10 Surfaces of Revolution
5.11 Natural Equations of a Curve
5.12 A Word About Rigor
5.13 Conclusion
5.14 Problems
Applications in Mechanics
6.Linear Elasticity
6.1 Stress Tensor
6.2 StrainTensor
6.3 Equation of Motion
6.4 Hooke's Law
6.5 Eqrulibrium Equations in Displacements
6.6 Boundary Conditions and Boundary Value Problems
6.7 Equilibrium Equations in Stresses
6.8 Uniqueness of Solution for the Boundary Value Problems of Elasticity
6.9 Betti's Reciprocity Theorem
6.10 Muumum Total Energy Principle
6.11 Ritz's Method
6.12 Rayleigh's Variational Principle
6.13 Plane Waves
6.14 Plane Problems of Elasticity
6.15 Problems
7.Linear Elastic Shells
7.1 Some Useful Formulas of Surface Theory
7.2 Kinematics in a Neighborhood of ∑
7.3 Shell Eqrulibrium Equations
7.4 Shell Deformation and Strains; Kirchhoff's Hypotheses
7.5 Shell Energy
7.6 Boundary Conditions
7.7 A Few Remarks on the Kirchhoff—Love Theory
7.8 PlateTheory
7.9 On Non—Classical Theories of Plates and Shells
Appendix A Formulary
Appendix B Hints and Answers
Bibliography
Index
