Differential topology [ LMAT2430 ]
5.0 crédits ECTS
30.0 h + 15.0 h
Teacher(s) |
Debongnie Gery ;
|
Language |
French
|
Place of the course |
Louvain-la-Neuve
|
Prerequisites |
Precursory courses : a first course in differential geometry
|
Main themes |
In this course, we will study differential manifolds from a
topological perspective. The main tool will be the definition of de
Rham theory and other related notions.
|
Aims |
The aim of the course is to present in details some important tools in
differential topology. These tools should be useful to prepare the
student to do research in topology, geometry, or mathematical physic.
|
Evaluation methods |
Evaluation Homework(s) plus an oral examination.
|
Bibliography |
Support A book related to the theme of the year.
|
Other information |
|
Cycle et année d'étude |
> Master [120] in Mathematics
> Master [60] in Mathematics
|
Faculty or entity in charge |
> MATH
|
<<< Page précédente