Book contents
- Frontmatter
- Contents
- Preface
- 1 Introduction
- 2 Vectors and Tensors
- 3 Kinematics of Continua
- 4 Stress Measures
- 5 Conservation of Mass, Momenta, and Energy
- 6 Constitutive Equations
- 7 Linearized Elasticity Problems
- 8 Fluid Mechanics and Heat Transfer Problems
- 9 Linear Viscoelasticity
- References
- Answers to Selected Problems
- Index
2 - Vectors and Tensors
- Frontmatter
- Contents
- Preface
- 1 Introduction
- 2 Vectors and Tensors
- 3 Kinematics of Continua
- 4 Stress Measures
- 5 Conservation of Mass, Momenta, and Energy
- 6 Constitutive Equations
- 7 Linearized Elasticity Problems
- 8 Fluid Mechanics and Heat Transfer Problems
- 9 Linear Viscoelasticity
- References
- Answers to Selected Problems
- Index
Summary
A mathematical theory is not to be considered complete until you have made it so clear that you can explain it to the first man whom you meet on the street.
David HilbertBackground and Overview
In the mathematical description of equations governing a continuous medium, we derive relations between various quantities that characterize the stress and deformation of the continuum by means of the laws of nature (such as Newton's laws, conservation of energy, and so on). As a means of expressing a natural law, a coordinate system in a chosen frame of reference is often introduced. The mathematical form of the law thus depends on the chosen coordinate system and may appear different in another type of coordinate system. The laws of nature, however, should be independent of the choice of a coordinate system, and we may seek to represent the law in a manner independent of a particular coordinate system. A way of doing this is provided by vector and tensor analysis. When vector notation is used, a particular coordinate system need not be introduced. Consequently, the use of vector notation in formulating natural laws leaves them invariant to coordinate transformations. A study of physical phenomena by means of vector equations often leads to a deeper understanding of the problem in addition to bringing simplicity and versatility into the analysis.
- Type
- Chapter
- Information
- An Introduction to Continuum Mechanics , pp. 8 - 60Publisher: Cambridge University PressPrint publication year: 2007