University of Basel, Grosser Hörsaal, Mathematical Institute
BZ Seminar in Analysis: Yann Brenier (Ecole Polytechnique)
The usual heat equation is not suitable to preserve the topology of divergence-free vector fields, because it destroys their integral line structure. On the contrary, one can find, in the fluid mechanics literature, examples of topology-preserving diffusion equations. They are very degenerate since they admit all stationary solutions to the Euler equations as equilibrium points. For them, we provide a suitable concept of "dissipative gradient-flow solutions", which shares common features both with the dissipative solutions of P.-L. Lions for the Euler equations and the gradient-flow solutions "a la De Giorgi" recently used by Ambrosio-Gigli-Savare for the scalar heat equation in very general metric spaces. We show that the initial value problem admits such global solutions and they are unique whenever they are smooth.
Veranstaltung übernehmen als
iCal