Tensor analysis. ([2019])

Record Type:

Book

Title:

Tensor analysis. ([2019])

Main Title:

Tensor analysis

Further Information:

Note: Fridtjov Irgens.

Other Names:

Irgens, Fridtjov, 1935-

Contents:

Intro; Preface; A Short Presentation of the Contents of This Book; References; Contents; Symbols; 1 Mathematical Foundation; 1.1 Matrices and Determinants; 1.2 Cartesian Coordinate Systems. Scalars and Vectors; 1.2.1 Displacement Vectors; 1.2.2 Vector Algebra; 1.3 Cartesian Coordinate Transformations; 1.4 Curves in Space; 1.5 Dynamics of a Mass Particle; 1.6 Scalar Fields and Vector Fields; 2 Dynamics. The Cauchy Stress Tensor; 2.1 Kinematics; 2.1.1 Lagrangian Coordinates and Eulerian Coordinates; 2.1.2 Material Derivative of Intensive Quantities 2.1.3 Material Derivative of Extensive Quantities2.2 Equations of Motion; 2.2.1 Euler's Axioms; 2.2.2 Newton's Third Law of Action and Reaction; 2.2.3 Coordinate Stresses; 2.2.4 Cauchy's Stress Theorem and Cauchy's Stress Tensor; 2.2.5 Cauchy's Equations of Motion; 2.3 Stress Analysis; 2.3.1 Principal Stresses and Principal Stress Directions; 2.3.2 Stress Deviator and Stress Isotrop; 2.3.3 Extreme Values of Normal Stress; 2.3.4 Maximum Shear Stress; 2.3.5 State of Plane Stress; 2.3.6 Mohr-Diagram for State of Plane Stress; Reference; 3 Tensors; 3.1 Definition of Tensors; 3.2 Tensor Algebra 3.2.1 Isotropic Tensors of Fourth Order3.2.2 Tensors as Polyadics; 3.3 Tensors of Second Order; 3.3.1 Symmetric Tensors of Second Order; 3.3.2 Alternative Invariants of Second Order Tensors; 3.3.3 Deviator and Isotrop of Second Order Tensors; 3.4 Tensor Fields; 3.4.1 Gradient, Divergence, and Rotation of Tensor Fields; 3.4.2 Del-Operators; 3.4.3Intro; Preface; A Short Presentation of the Contents of This Book; References; Contents; Symbols; 1 Mathematical Foundation; 1.1 Matrices and Determinants; 1.2 Cartesian Coordinate Systems. Scalars and Vectors; 1.2.1 Displacement Vectors; 1.2.2 Vector Algebra; 1.3 Cartesian Coordinate Transformations; 1.4 Curves in Space; 1.5 Dynamics of a Mass Particle; 1.6 Scalar Fields and Vector Fields; 2 Dynamics. The Cauchy Stress Tensor; 2.1 Kinematics; 2.1.1 Lagrangian Coordinates and Eulerian Coordinates; 2.1.2 Material Derivative of Intensive Quantities 2.1.3 Material Derivative of Extensive Quantities2.2 Equations of Motion; 2.2.1 Euler's Axioms; 2.2.2 Newton's Third Law of Action and Reaction; 2.2.3 Coordinate Stresses; 2.2.4 Cauchy's Stress Theorem and Cauchy's Stress Tensor; 2.2.5 Cauchy's Equations of Motion; 2.3 Stress Analysis; 2.3.1 Principal Stresses and Principal Stress Directions; 2.3.2 Stress Deviator and Stress Isotrop; 2.3.3 Extreme Values of Normal Stress; 2.3.4 Maximum Shear Stress; 2.3.5 State of Plane Stress; 2.3.6 Mohr-Diagram for State of Plane Stress; Reference; 3 Tensors; 3.1 Definition of Tensors; 3.2 Tensor Algebra 3.2.1 Isotropic Tensors of Fourth Order3.2.2 Tensors as Polyadics; 3.3 Tensors of Second Order; 3.3.1 Symmetric Tensors of Second Order; 3.3.2 Alternative Invariants of Second Order Tensors; 3.3.3 Deviator and Isotrop of Second Order Tensors; 3.4 Tensor Fields; 3.4.1 Gradient, Divergence, and Rotation of Tensor Fields; 3.4.2 Del-Operators; 3.4.3 Directional Derivative of Tensor Fields; 3.4.4 Material Derivative of Tensor Fields; 3.5 Rigid-Body Dynamics. Kinematics; 3.5.1 Pure Rotation About a Fixed Axis; 3.5.2 Pure Rotation About a Fixed Point; 3.5.3 Kinematics of General Rigid-Body Motion 3.6 Rigid-Body Dynamics. Kinetics3.6.1 Rotation About a Fixed Point. The Inertia Tensor; 3.6.2 General Rigid-Body Motion; 3.7 Q-Rotation of Vectors and Tensors of Second Order; 3.8 Polar Decomposition; 3.9 Isotropic Functions of Tensors; References; 4 Deformation Analysis; 4.1 Strain Measures; 4.2 Green's Strain Tensor; 4.3 Small Strains and Small Deformations; 4.3.1 Small Strains; 4.3.2 Small Deformations; 4.3.3 Principal Strains and Principal Directions for Small Deformations; 4.3.4 Strain Deviator and Strain Isotrop for Small Deformations; 4.3.5 Rotation Tensor for Small Deformations 4.3.6 Small Deformations in a Material Surface4.3.7 Mohr-Diagram for Small Deformations in a Surface; 4.4 Rates of Deformation, Strain, and Rotation; 4.5 Large Deformations; 5 Constitutive Equations; 5.1 Introduction; 5.2 Linearly Elastic Materials; 5.2.1 Generalized Hooke's Law; 5.2.2 Some Basic Equations in Linear Elasticity. Navier's Equations; 5.2.3 Stress Waves in Elastic Materials; 5.3 Linearly Viscous Fluids; 5.3.1 Definition of Fluids; 5.3.2 The Continuity Equation; 5.3.3 Constitutive Equations for Linearly Viscous Fluids; 5.3.4 The Navier-Stokes Equations; 5.3.5 Film Flow; References … (more)

Publisher Details:

Cham, Switzerland : Springer

Publication Date:

2019

Extent:

1 online resource

Subjects:

515/.63
Calculus of tensors
Electronic books

Languages:

English

ISBNs:

9783030034122
3030034127

Related ISBNs:

9783030034115
3030034119

Notes:

Note: Description based on online resource; title from digital title page (viewed on February 05, 2019).

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