The project has addressed questions in 4 different directions, corresponding to as many work packages.
These are WP1: Existence, WP2: Singularities, WP3 Uniqueness and WP4: Other models. Without extending in technical aspects we summarise results in these packages:
- Existence of different classes of vortex-patch and vortex-sheet-like solutions have been considered
- For the Camass-Holm equation, and concerning singular solutions results established include: Holder continuity, Lipschitz continuity (into L^2, the energy space),...
- Uniqueness of dissipative solutions of the Camassa-Holm equation has been proven. This complete the global well-posedness theory of this celebrated model of shallow water, providing a mathematical rationale for the feasibility of the Camassa-Holm equation as a model of water waves encompassing both soliton interactions and wave-breaking.
- Other systems have been considered, including 2D Euler, SQG, and alpha models, obtaining results for symmetric vortex-patch solutions.