 | |
| MATH0052-1 | Advanced mathematics for physicists
 |
|
| Duration : | 30h Th, 30h Pr |
|
| Credits/ECTS : |
|
|
| Holder(s) : | Peter Schlagheck |
|
| Language : | French language |
|
| Course contents : | 1. Applications of integral transforms (convolution, Fourier, Laplace, wavelets)
2. Orthogonal polynomials and special functions
3. Functions of a complex variable
4. Differential equations
5. Partial differential equations
6. Distributions
7. Nonlinear differential equations. Stability theory. |
|
| Course objective : | - completion of the set of mathematical tools used by physicists
- practical solutions of physical problems
- matheticals tools of quantum theory |
|
| Prerequisites : | Mathematical analysis
Linear algebra |
|
| Workshops : | practical exercices (30h.) |
|
| Organization : | Theory (30h.)
Practical exercices (30h.), including exercices on computers |
|
| Written notes : | - lecture notes from the professor distributed to the students
- reference books |
|
| Assessment : | Written exam + oral (January), written exam (August or September)
Theory (20%)
Exercices (65%)
Reports on computer exercices (15%) |
|
| Remarks : | |
|
