# 9600-0007/01 – Mathematical Theory of Elasticity (MTP)

 Gurantor department IT4Innovations Credits 10 Subject guarantor doc. Ing. Radim Halama, Ph.D. Subject version guarantor doc. Ing. Radim Halama, Ph.D. Study level postgraduate Requirement Choice-compulsory Year Semester winter + summer Study language Czech Year of introduction 2015/2016 Year of cancellation Intended for the faculties USP, FEI Intended for study types Doctoral
Instruction secured by
HAL22 doc. Ing. Radim Halama, Ph.D.
Extent of instruction for forms of study
Form of studyWay of compl.Extent
Full-time Examination 2+0
Combined Examination 10+0

### Subject aims expressed by acquired skills and competences

The aim is to introduce students to the basics of mathematical theory of elasticity; basic understanding of this area. This subject is the prerequisite of success in solving a whole range of technical problems.

### Teaching methods

Lectures
Individual consultations

### Summary

Within the course, students will become familiar with basic equations of mathematical theory of elasticity in all basic coordinate systems. They will be introduced to constructing the equations of mathematical theory of elasticity for general orthogonal curvilinear coordinate system. Students will further acquire knowledge of basic methods for solving elasticity and solidity problems with respect to various types of boundary conditions.

### Compulsory literature:

• Richard B. Hetnarski, Józef Ignaczak, The Mathematical Theory of Elasticity, Second Edition, 2010

### Recommended literature:

Other corresponding internet sources.

### E-learning

No other requirements.

### Prerequisities

Subject has no prerequisities.

### Co-requisities

Subject has no co-requisities.

### Subject syllabus:

Within the course, students will become familiar with basic equations of mathematical theory of elasticity in all basic coordinate systems. They will be introduced to constructing the equations of mathematical theory of elasticity for general orthogonal curvilinear coordinate system. Students will further acquire knowledge of basic methods for solving elasticity and solidity problems with respect to various types of boundary conditions.

### Conditions for subject completion

Combined form (validity from: 2015/2016 Winter semester)
Min. number of points
Examination Examination
Mandatory attendence parzicipation:

Show history

### Occurrence in study plans

Academic yearProgrammeField of studySpec.FormStudy language Tut. centreYearWSType of duty
2019/2020 (P2658) Computational Sciences (2612V078) Computational Sciences P Czech Ostrava Choice-compulsory study plan
2019/2020 (P2658) Computational Sciences (2612V078) Computational Sciences K Czech Ostrava Choice-compulsory study plan
2019/2020 (P0613D140020) Computational Science P Czech Ostrava Choice-compulsory type B study plan
2018/2019 (P2658) Computational Sciences (2612V078) Computational Sciences P Czech Ostrava Choice-compulsory study plan
2018/2019 (P2658) Computational Sciences (2612V078) Computational Sciences K Czech Ostrava Choice-compulsory study plan
2017/2018 (P2658) Computational Sciences (2612V078) Computational Sciences P Czech Ostrava Choice-compulsory study plan
2017/2018 (P2658) Computational Sciences (2612V078) Computational Sciences K Czech Ostrava Choice-compulsory study plan
2016/2017 (P2658) Computational Sciences (2612V078) Computational Sciences P Czech Ostrava Choice-compulsory study plan
2016/2017 (P2658) Computational Sciences (2612V078) Computational Sciences K Czech Ostrava Choice-compulsory study plan
2015/2016 (P2658) Computational Sciences (2612V078) Computational Sciences P Czech Ostrava Choice-compulsory study plan
2015/2016 (P2658) Computational Sciences (2612V078) Computational Sciences K Czech Ostrava Choice-compulsory study plan

### Occurrence in special blocks

Block nameAcademic yearForm of studyStudy language YearWSType of blockBlock owner