- Día: 6 de Noviembre de 2020
- Hora: 11:30 – 12:30
- Lugar: Videoconferencia Sala EUROPA de la UGR, en Sala EUROPA de la UGR (Acceso Sala Virtual Europa)
Contraseña de la reunión: 237948. - Ponente: Alberto Roncoroni (Universidad de Granada, España)
Resumen:
We consider the following critical p-Laplace equation:
(1)Δpu+up∗−1=0 in Rn
with n≥2 and 1<p<n. Equation (1) has been largely studied in the PDE’s and geometric analysis’ communities, since extremals of Sobolev inequality solve (1) and, for p=2, the equation is related to the Yamabe’s problem. In particular, it has been recently shown, exploiting the moving planes method, that positive solutions to (1) such that
u∈Lp∗(Rn) and ∇u∈Lp(Rn)
can be completely classified. In the talk we will consider the anisotropic critical p-Laplace equation in convex cones of Rn. Since the moving plane method strongly relies on the symmetries of the equation and of the domain, in the talk a different approach to this problem will be presented. In particular this approach gives a complete classification of the solutions in an anisotropic setting. More precisely, we characterize solutions to the critical p-Laplace equation induced by a smooth norm inside any convex cone of Rn.
This is a joint work with G. Ciraolo and A. Figalli.
- Alba Morquecho Delgado
- Gerencia del Instituto de Matemáticas IEMath-GR