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[美] 特马姆(Roger M.Temam) 著
出版社: 世界图书出版公司 ISBN:9787510084454 版次:2 商品编码:11593487 包装:平装 外文名称:Mathematical Modeling in Continuum Mechanics 开本:24开 出版时间:2015-01-01 用纸:胶版纸 页数:342 正文语种:英文
A few words about notations
PART I FUNDAMENTAL CONCEPTS IN CONTINUUM MECHANICS
1 Describing the motion of a system: geometry and kinematics
1.1 Deformations
1.2 Motion and its observation (kinematics)
1.3 Description of the motion of a system: Eulerian and Lagrangian derivatives
1.4 Velocity field of a rigid body: helicoidal vector fields
1.5 Differentiation of a volume integral depending on a parameter
2 The fundamental law of dynamics
2.1 The concept of mass
2.2 Forces
2.3 The fundamental law of dynamics and its first consequences
2.4 Application to systems of material points and to rigid bodies
2.5 Galilean frames: the fundamental law of dynamics expressed in a non—Galilean frame
3 The Canchy stress tensor and the Piola—Kirchhoff tensor.Applications
3.1 Hypotheses on the cohesion forces
3.2 The Canchy stress tensor
3.3 General equations of motion
3.4 Symmetry of the stress tensor
3.5 The Piola—Kirchhoff tensor
4 Real and virtual powers
4.1 Study of a system of material points
4.2 General material systems: rigidifying velocities
4.3 Virtual power of the cohesion forces: the general case
4.4 Real power: the kinetic energy theorem
5 Deformation tensor, deformation rate tensor,constitutive laws
5.1 Further properties of deformations
5.2 The deformation rate tensor
5.3 Introduction to rheology: the constitutive laws
5.4 Appendix.Change of variable in a surface integral
6 Energy equations and shock equations
6.1 Heat and energy
6.2 Shocks and the Rankine——Hugoniot relations
PART Ⅱ PHYSICS OF FLUIDS
7 General properties of Newtonian fluids
7.1 General equations of fluid mechanics
7.2 Statics of fluids
7.3 Remark on the energy of a fluid
8 Flows of inviscid fluids
8.1 General theorems
8.2 Plane h'rotational flows
8.3 Transsonic flows
8.4 Linear accoustics
9 Viscous fluids and thermohydraulics
9.1 Equations of viscous incompressible fluids
9.2 Simple flows of viscous incompressible fluids
9.3 Thermohydranlics
9.4 Equations in nondimensional form: similarities
9.5 Notions of stability and turbulence
9.6 Notion of boundary layer
10 Magnetohydrodynamics and inertial confinement of plasmas
10.1 The Maxwell equations and electromagnetism
10.2 Magnetohydrodynamics
10.3 The Tokamak machine
11 Combustion
11.1 Equations for mixtures of fluids
11.2 Equations of chemical kinetics
11.3 The equations of combustion
11.4 Stefan—Maxwell equations
11.5 A simplified problem: the two—species model
12 Equations of the atmosphere and of the ocean
12.1 Preliminaries
12.2 Primitive equations of the atmosphere
12.3 Primitive equations of the ocean
12.4 Chemistry of the atmosphere and the ocean Appendix.The differential operators in spherical coordinates
PART Ⅲ SOLID MECHANICS
13 The general equations of linear elasticity
13.1 Back to the stress—strain law of linear elasticity: the elasticity coefficients of a material
13.2 Boundary value problems in linear elasticity: the linearization principle
13.3 Other equations
13.4 The limit of elasticity criteria
14 Classical problems of elastostatics
14.1 Longitudinal traction——compression of a cylindrical bar
14.2 Uniform compression of an arbitrary body
14.3 Equilibrium of a spherical container subjected to external and internal pressures
14.4 Deformation of a vertical cylindrical body under the action of its weight
14.5 Simple bending of a cylindrical beam
14.6 Torsion of cylindrical shafts
14.7 The Saint—Venant principle
15 Energy theorems, duality, and variational formulations
15.1 Elastic energy of a material
15.2 Duality—generalization
15.3 The energy theorems
15.4 Variational formulations
15.5 Virtual power theorem and variational formulations
16 Introduction to nonlinear constitutive laws and to homogenization
16.1 Nonlinear constitutive laws (nonlinear elasticity)
16.2 Nonlinear elasticity with a threshold(Henky's elastoplastic model)
16.3 Nonconvex energy functions
16.4 Composite materials: the problem of homogenization
17 Nonlinear elasticity and an application to biomechanics
17.1 The equations of nonlinear elasticity
17.2 Boundary conditions—boundary value problems
17.3 Hyperelastic materials
17.4 Hyperelastic materials in biomechanics
PART Ⅳ INTRODUCTION TO WAVE PHENOMENA
18 Linear wave equations in mechanics
18.1 Returning to the equations of linear acoustics and of linear elasticity
18.2 Solution of the one—dimensional wave equation
18.3 Normal modes
18.4 Solution of the wave equation
18.5 Superposition of waves, beats, and packets of waves
19 The soliton equation: the Korteweg—de Vries equation
19.1 Water—wave equations
19.2 Simplified form of the water—wave equations
19.3 The Korteweg—de Vries equation
19.4 The soliton solutions of the KdV equation
20 The nonlinear Schrodinger equation
20.1 Maxwell equations for polarized media
20.2 Equations of the electric field: the linear case
20.3 General case
20.4 The nonlinear Schrodinger equation
20.5 Soliton solutions of the NLS equation
Appendix.The partial differential equations of mechanics
Hints for the exercises
References
Index
连续介质力学中的数学模型(第2版) [Mathematical Modeling in Continuum Mechanics] 电子书 下载 mobi epub pdf txt
连续介质力学中的数学模型(第2版) [Mathematical Modeling in Continuum Mechanics]-so88
连续介质力学中的数学模型(第2版) [Mathematical Modeling in Continuum Mechanics] pdf epub mobi txt 电子书 下载 2022
图书介绍
☆☆☆☆☆
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[美] 特马姆(Roger M.Temam) 著
出版社: 世界图书出版公司 ISBN:9787510084454 版次:2 商品编码:11593487 包装:平装 外文名称:Mathematical Modeling in Continuum Mechanics 开本:24开 出版时间:2015-01-01 用纸:胶版纸 页数:342 正文语种:英文
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《连续介质力学中的数学模型(第2版)》是作者精心为广大读者朋友们编写而成的,可以让更多的读者朋友们从书中了解到更多的知识,从而提升读者朋友们自身的知识水平。让我们跟随作者的脚步来更好的阅读《连续介质力学中的数学模型(第2版)》中的内容。《连续介质力学中的数学模型(第2版)》可作为物理、力学专业高年级本科生及应用数学、物理学和工程类的研究生的教材和参考书。内页插图
目录
PrefaceA few words about notations
PART I FUNDAMENTAL CONCEPTS IN CONTINUUM MECHANICS
1 Describing the motion of a system: geometry and kinematics
1.1 Deformations
1.2 Motion and its observation (kinematics)
1.3 Description of the motion of a system: Eulerian and Lagrangian derivatives
1.4 Velocity field of a rigid body: helicoidal vector fields
1.5 Differentiation of a volume integral depending on a parameter
2 The fundamental law of dynamics
2.1 The concept of mass
2.2 Forces
2.3 The fundamental law of dynamics and its first consequences
2.4 Application to systems of material points and to rigid bodies
2.5 Galilean frames: the fundamental law of dynamics expressed in a non—Galilean frame
3 The Canchy stress tensor and the Piola—Kirchhoff tensor.Applications
3.1 Hypotheses on the cohesion forces
3.2 The Canchy stress tensor
3.3 General equations of motion
3.4 Symmetry of the stress tensor
3.5 The Piola—Kirchhoff tensor
4 Real and virtual powers
4.1 Study of a system of material points
4.2 General material systems: rigidifying velocities
4.3 Virtual power of the cohesion forces: the general case
4.4 Real power: the kinetic energy theorem
5 Deformation tensor, deformation rate tensor,constitutive laws
5.1 Further properties of deformations
5.2 The deformation rate tensor
5.3 Introduction to rheology: the constitutive laws
5.4 Appendix.Change of variable in a surface integral
6 Energy equations and shock equations
6.1 Heat and energy
6.2 Shocks and the Rankine——Hugoniot relations
PART Ⅱ PHYSICS OF FLUIDS
7 General properties of Newtonian fluids
7.1 General equations of fluid mechanics
7.2 Statics of fluids
7.3 Remark on the energy of a fluid
8 Flows of inviscid fluids
8.1 General theorems
8.2 Plane h'rotational flows
8.3 Transsonic flows
8.4 Linear accoustics
9 Viscous fluids and thermohydraulics
9.1 Equations of viscous incompressible fluids
9.2 Simple flows of viscous incompressible fluids
9.3 Thermohydranlics
9.4 Equations in nondimensional form: similarities
9.5 Notions of stability and turbulence
9.6 Notion of boundary layer
10 Magnetohydrodynamics and inertial confinement of plasmas
10.1 The Maxwell equations and electromagnetism
10.2 Magnetohydrodynamics
10.3 The Tokamak machine
11 Combustion
11.1 Equations for mixtures of fluids
11.2 Equations of chemical kinetics
11.3 The equations of combustion
11.4 Stefan—Maxwell equations
11.5 A simplified problem: the two—species model
12 Equations of the atmosphere and of the ocean
12.1 Preliminaries
12.2 Primitive equations of the atmosphere
12.3 Primitive equations of the ocean
12.4 Chemistry of the atmosphere and the ocean Appendix.The differential operators in spherical coordinates
PART Ⅲ SOLID MECHANICS
13 The general equations of linear elasticity
13.1 Back to the stress—strain law of linear elasticity: the elasticity coefficients of a material
13.2 Boundary value problems in linear elasticity: the linearization principle
13.3 Other equations
13.4 The limit of elasticity criteria
14 Classical problems of elastostatics
14.1 Longitudinal traction——compression of a cylindrical bar
14.2 Uniform compression of an arbitrary body
14.3 Equilibrium of a spherical container subjected to external and internal pressures
14.4 Deformation of a vertical cylindrical body under the action of its weight
14.5 Simple bending of a cylindrical beam
14.6 Torsion of cylindrical shafts
14.7 The Saint—Venant principle
15 Energy theorems, duality, and variational formulations
15.1 Elastic energy of a material
15.2 Duality—generalization
15.3 The energy theorems
15.4 Variational formulations
15.5 Virtual power theorem and variational formulations
16 Introduction to nonlinear constitutive laws and to homogenization
16.1 Nonlinear constitutive laws (nonlinear elasticity)
16.2 Nonlinear elasticity with a threshold(Henky's elastoplastic model)
16.3 Nonconvex energy functions
16.4 Composite materials: the problem of homogenization
17 Nonlinear elasticity and an application to biomechanics
17.1 The equations of nonlinear elasticity
17.2 Boundary conditions—boundary value problems
17.3 Hyperelastic materials
17.4 Hyperelastic materials in biomechanics
PART Ⅳ INTRODUCTION TO WAVE PHENOMENA
18 Linear wave equations in mechanics
18.1 Returning to the equations of linear acoustics and of linear elasticity
18.2 Solution of the one—dimensional wave equation
18.3 Normal modes
18.4 Solution of the wave equation
18.5 Superposition of waves, beats, and packets of waves
19 The soliton equation: the Korteweg—de Vries equation
19.1 Water—wave equations
19.2 Simplified form of the water—wave equations
19.3 The Korteweg—de Vries equation
19.4 The soliton solutions of the KdV equation
20 The nonlinear Schrodinger equation
20.1 Maxwell equations for polarized media
20.2 Equations of the electric field: the linear case
20.3 General case
20.4 The nonlinear Schrodinger equation
20.5 Soliton solutions of the NLS equation
Appendix.The partial differential equations of mechanics
Hints for the exercises
References
Index
前言/序言
连续介质力学中的数学模型(第2版) [Mathematical Modeling in Continuum Mechanics] 电子书 下载 mobi epub pdf txt
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