M2RI Syllabus 2024-2025

Funding

The EUR project MINT is offering each year some funding for master students (French or foreign students can all apply).
Deadline for application: February 3rd 2024 at 10.00 p.m (Paris time).

Applications

If you are from a non European country in the following list,  in order to apply for a French diploma you have to pass through the interview system of Campus France BEFORE THE END OF MARCH 2024 : depending on your nationality and whether you are already studying in Europe, the precise procedure varies, check this webpage on the site of Campus France.

(Algeria, Argentina, Benin, Brazil, Burkina Faso, Burundi Cameroon, Chile, China, Colombia, Comoros, the Republic of the Congo, South Korea, Ivory Coast, Egypt, United States, Gabon, Guinea, Haïti, India, Indonesia, Iran, Japan, Kuwait, Lebanon, Madagascar, Mali, Morocco, Mauritius, Mauritania, Mexico, Nigeria, Peru, Senegal, Democratic Republic of Congo, Russia, Senegal, Singapore, Taiwan, Tchad, Togo, Tunisia, Turkey and Vietnam)

Our Master appears currently in the Campus France system as « Master professionnel Sciences, technologies, santé mention mathématiques et applications parcours Recherche et Innovation » in Toulouse Université Paul Sabatier.

For French students (or from European Union), you should check the inscription page of Université Paul Sabatier and fill the pre-inscription form.
This does not concern students from Toulouse already enrolled in M1 ESR.

• A1. Algebraic Topology (R. Campos) syllabus A1
• A2. Holomorphic Dynamical Systems (A. Chéritat) syllabus A2
• A3. Introduction to Complex Analytic Geometry (D. Popovici) syllabus A3
•  A4. Introduction to Optimal Mass Transport (J. Bertrand) syllabus A4
• A5 : Elliptic PDEs and Evolution Problems (M. Maris) syllabus A5
• A6 : An Introduction to the Theoretical and Numerical Analysis of Nonlinear Conservation Laws (F. Filbet) syllabus A6
• A7. Convergence of Probability Measures and Optimal Transport (C. Pellegrini) syllabus A7
• A8. Stochastic Calculus (S. Cohen) syllabus A8
• A9. Asymptotic Statistics (P. Neuvial, F. Bachoc) syllabus A9
• A10. Approximation of PDEs (G. Haine, D. Matignon, S. Pernet, M. Salaün) syllabus A10
• A11. Advanced statistical methods (F. Simatos) syllabus A11
• A12. MINT "inverted class" An Invitation to Arithmetic Geometry (J. Gillibert) syllabus A12

• B1. Introduction to Symplectic Topology (J. Gutt) syllabus B1
• B2. Introduction to Homotopy Theory (J. Bellier-Millès, J. Nuiten) syllabus B2
• B3. Regularity Theory for Minimizing Harmonic Maps (P. Bousquet) syllabus B3
• B4. Scientific computing (J. Heleine) syllabus B4
• B5. Branching Processes (P. Maillard, M. Pain) syllabus B5
• B6. Robust Optimization and Statistical Learning (F. Iutzeler) syllabus B6

• C1. Mapping Class Group (M. Wolff, F. Costantino) syllabus C1
• C2. Hyperbolic systems (M.-H. Vignal) syllabus C2
• C3. From point processes to Hawkes processes (M. Costa) syllabus C3