| Lectures and exercises |
hours |
| Topics |
Specific contents |
|
| Integration |
an outline of Lebesgue integral, multiple integrals |
8
|
| Fourier Series |
pointwise and uniform convergence, differentiation and integration of Fourier series, Parseval’s equality, an outline of Fourier series in L2 |
10
|
| Complex Analysis |
analytic functions, elementary functions, residue theorem and applications to real integration |
11
|
| Fourier transform |
rules, the transform of convolution, the inverse transform, application to ordinary differential equations; an outline of Fourier transform of distributions |
11
|
| Laplace transform |
rules, the transform of convolution, the inverse transform, applications to ordinary differential equations |
10
|
| Total hours for lectures and exercises |
50 |
| for exercises only |
15 |
|
Further educational activities
|
hours
|
| Labs |
|
| Tutorials / Seminars |
|
| Workshops |
|
| Guided tours |
|
| additional exercises (calculus) |
12 |
| Total hours for further educational activities |
12 |
| Total hours |
62
|