Numerical analysis

5 credits

30.0 h + 22.5 h

Teacher(s)

Henrotte François (compensates Remacle Jean-François); Remacle Jean-François;

Language

French

Prerequisites

First cycle level in numerical calculus and programming (LFSAB1104) and in linear algebra (LFSAB1101).

Main themes

Numerical methods for solving non-linear equations
Numerical methods for solving linear systems : iterative methods
Numerical methods for solving eigenvalue and eigenvector problems
Numerical solution of ordinary differential equations : initial value problems

Aims

At the end of this learning unit, the student is able to :

With respect to the AA reference, this course contributes to the development, acquisition and evaluation of the following learning outcomes :

AA1.1, AA1.2, AA1.3
AA2.1, AA2.4
AA5.2, AA5.3, AA5.5

More precisely, after completing this course, the student will have the ability to :

Analyze in depth the various key methods and algorithms for the numerical solution of important classes of problems from science and industry, related to applied mathematics
Better understand the numerical behavior of the various numerical algorithms for the solution of linear as well as nonlinear problems
Implement these methods in a high level computer language and verify their numerical behavior on a practical problem

Transversal learning outcomes :

Collaborate in a small team to solve a mathematical problem using numerical methods

The contribution of this Teaching Unit to the development and command of the skills and learning outcomes of the programme(s) can be accessed at the end of this sheet, in the section entitled “Programmes/courses offering this Teaching Unit”.

Content

Non-linear equations : location of the roots of a polynomial, various iterative methods and convergence theorems
Iterative methods for linear systems : conjugate gradients, Jacobi and Gauss-Seidel methods, GMRES
Eigenvalue and eigenvector problems : power method, subspace iteration, Krylov methods
Initial value problems for ordinary differential equations : Runge-Kutta, mutli-step methods, error estimation and discussion of numerical stability

Teaching methods

Classes organized following the EPL guidelines.
Exercises and/or homeworks done in small groups and supervised by an assistant
A more detailed organization is specified each year in the course plan provided on Moodle.

Evaluation methods

The students are evaluated for a large part on the basis of an exam organized following the EPL guidelines. The exam will be on the contents of the course notes, with the exception of the material specified on Moodle after the last course.

Another part of the evaluation is on the homeworks and/or exercises done during the year.

More detailed information of the evaluation criteria are provided in the course plan available on iCampus at the beginning of the semester.

Online resources

The support documents of the course are available on Moodle at the following address :
https://moodleucl.uclouvain.be/course/view.php?id=10034
The web site contains the course notes, the transparencies and the course plan.

Bibliography

De nombreuses références sont utilisées et mentionnées au cours. Le seul support obligatoire est le syllabus disponible sur iCampus.

Faculty or entity

MAP

Programmes / formations proposant cette unité d'enseignement (UE)

Title of the programme

Sigle

Credits

Prerequisites

Aims

Master [120] in Statistics: General

STAT2M

Master [120] in Mathematics

MATH2M

Minor in Engineering Sciences: Applied Mathematics

LMAP100I