Monday, February 26 2024.
Programme 2024/02/26 - 2024/04/30
Basque Center for Applied Mathematics - BCAM
1) PART 1: IDEAL FLUID FLOWS | Speaker: Francesco Fanelli (BCAM)
- The Euler equations and basic properties
- Strong solutions theory
- Beale-Kato-Majda continuation criterion and application: global existence in 2-D
- More on the 2-D case: Yudovich theory and the study of vortex patches
- The case of the ideal magnetohydrodynamics: general theory in any space dimension; the 2-D case
When: from Monday 26/02 to Wednesday 20/03 (4 weeks).
Schedule:
- Monday - 10:00 - 12:00
- Wednesday - 10:00 - 12:00.
2) PART 2: VISCOUS FLOWS | Speaker: Renato Lucà (BCAM)
- The Navier Stokes equation
- Local and small data, Strong solutions in 3D
- Global Strong solutions in 2D
- Weak solutions in 3D, the Leray Theory
- Weak-Strong uniqueness criteria
- Resistive magnetohydrodynamics, basic properties
- Topological aspects of Ideal and resistive magnetohydrodynamics
When: from Monday 08/04 to Wednesday 03/05 (4 weeks).
Schedule:
- Monday - 11:00 - 13:00
- Wednesday - 11:00 - 13:00.
Note: The last lecture will be on Tuesday 30/04, 11:00 - 13:00 (Wednesday 01/05 is bank holiday)
REFERENCES:
- Robinson, Rodrigo, Sadowski: \"The 3 dimensional Navier-Stokes equation\".
- Bertozzi, Majda: \"Vorticity and Incompressible Flow\".
- Bahouri, Chemin, Danchin: \"Fourier analysis and nonlinear partial differential equations\".
