Numerical Analysis : Approximation, Interpolation, Integration [ LINMA2171 ]
5.0 crédits ECTS
30.0 h + 22.5 h
1q
| Teacher(s) |
Magnus Alphonse ;
|
| Language |
French
|
Place
of the course |
Louvain-la-Neuve
|
| Main themes |
- Approximation of functions by polynomials: Chebyshev (best approximation, polynomial series), L2 norm (best average approximation, orthogonal polynomial series, Fourier series).
- Interpolation of functions divided by polynomials: Lagrange and Newton formulas, divided differences, iterative methods of Neville, formulas of finished differences.
- Numerical integration: Gaussian methods, formulas of finished differences.
- Error estimation and applications: Peano theorem, Euler-Maclaurin formula, extrapolation to the limit (Romberg scheme, etc.) Modalities of organisation: exercises: in class, in relation with the material seen. This activity will receive a grade that will come into play in the final points. Exam: oral on the material seen in class (closed book), partially with written preparation.
|
| Aims |
In-depth analysis of diverse methods and algorithms representative in the matter of numerical resolution by computers of significant classes of scientific or technical problems, in relation with the themes underlying the applied mathematics
|
| Content |
See at the following address :
http://www.math.ucl.ac.be/~magnus/num1a/m2171to.txt
|
| Other information |
See at the following address :
http://www.math.ucl.ac.be/~magnus/num1a/m2171to.txt
|
Cycle et année
d'étude |
> Bachelor in Mathematics
> Master [120] in Mathematical Engineering
> Master [120] in Statistics: General
> Master [120] in Physics
|
Faculty or entity
in charge |
> MAP
|
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