In this lecture, tensors, an important concept in continuum mechanics, will be explained. First, tensor algebra as a basic theory will be presented and the characteristics of symmetric and skew-symmetric tensors will be explained. Then, examples of concrete tensors such as the strain tensor and stress tensor will be given.
Since building structures are mainly composed of frames such as columns and beams, a single-axis (one-dimensional) stress-strain relationship is often sufficient, as in structural mechanics or material mechanics. However, structures are three-dimensional in nature, and it is necessary to understand tensors in order to understand local three-dimensional stresses and strains and to master the basic theory of the finite element method. I hope that the students will understand the abstract concept of tensors and feel the necessity and usefulness of tensors through examples.
By the end of this course, students will be able to:
1) Understand concept of tensor variables and difference from scalar or vector variables.
2) Understand the reason why the tensor analysis is used and explain usefulness of the tensor analysis.
3) Derive strain tensors, etc.
Tensor, Continuum mechanics, Earthquake engineering
✔ Specialist skills | Intercultural skills | Communication skills | Critical thinking skills | Practical and/or problem-solving skills |
Students will be asked to work on exercises.
Course schedule | Required learning | |
---|---|---|
Class 1 | Outline of this lecture | Concept of tensor and usefulness of tensor analysis, Direct notation, Vector algebra |
Class 2 | Basic tensor theory (1) | Tensor algebra, Transpose, Symmetric, Skew-symmetric, Principal invariants |
Class 3 | Basic tensor theory (2) | Tensor product |
Class 4 | Basic tensor theory (3) | Proper vectors and proper numbers of tensors, Spectral representation |
Class 5 | Examples of tensors(1) | Strain tensor, Stress tensor, Principal axis of earthquake ground motions, Input energy tensor |
Class 6 | Examples of tensors(2) | Effective mass tensor, Calculation of input energy by multidimensional earthquake motions |
Class 7 | Exercise | Exercises on tensors |
Class 8 | Advanced tensor analysis | Tensors in curvilinear coordinate systems |
To enhance effective learning, students are encouraged to spend approximately 100 minutes preparing for class and another 100 minutes reviewing class content afterwards (including assignments) for each class.
They should do so by referring to course material.
None
Lecture materials will be distributed as needed.
Students' knowledge of tensor and related problems will be assessed.
Exercise problems 100%.
Students must have successfully completed structural mechanics or have equivalent knowledge.