1. Revision of Fundamental Knowledge and Terms in the Field of Continuum Mechanics.
2. Modelling of Continuum Mechanics Problems. Analytical and Numerical Solutions. Finite Difference Method.
3. Finite Element Method – Principle, Basic Equation Solution, Application to Thermal and Electric Fields Linear Problems. Stationary and Non-stationary Processes.
4. Finite Element Methods – Reference Points, Gaussian Integral, Errors and Adaptive Finite Element Method and Its Application. Convergence.
5. Boundary Element Method – Principle, Differences between FEM and BEM, Basic Equation Solution, Fundamental Solution, Application to Thermal and Electric Fields Linear Problems. Stationary and Non-stationary Processes.
6. Boundary Element Method – Boundary Discretization and Types of Elements. Constructing System of Equations. Application of Boundary Conditions. Solutions of System of Equations.
7. Boundary Element Method – Generalized Formulation of BEM Using the Method of Weighted Residiuals.
8. Selected Practical Problems Solved by FEM and BEM. Comparative Study.
9. Possible FEM and BEM Combinations.
10. Non-linear Problems – Introduction to Non-linearities (geometrical, material, and contact non-linearities). Possible solutions.
2. Modelling of Continuum Mechanics Problems. Analytical and Numerical Solutions. Finite Difference Method.
3. Finite Element Method – Principle, Basic Equation Solution, Application to Thermal and Electric Fields Linear Problems. Stationary and Non-stationary Processes.
4. Finite Element Methods – Reference Points, Gaussian Integral, Errors and Adaptive Finite Element Method and Its Application. Convergence.
5. Boundary Element Method – Principle, Differences between FEM and BEM, Basic Equation Solution, Fundamental Solution, Application to Thermal and Electric Fields Linear Problems. Stationary and Non-stationary Processes.
6. Boundary Element Method – Boundary Discretization and Types of Elements. Constructing System of Equations. Application of Boundary Conditions. Solutions of System of Equations.
7. Boundary Element Method – Generalized Formulation of BEM Using the Method of Weighted Residiuals.
8. Selected Practical Problems Solved by FEM and BEM. Comparative Study.
9. Possible FEM and BEM Combinations.
10. Non-linear Problems – Introduction to Non-linearities (geometrical, material, and contact non-linearities). Possible solutions.