Abstract: “In 1983 A. Lazer and P.J. McKenna conjectured that the Ambrosetti-Prodi type problems have an unbounded number of solutions as a defined parameter grows to infinity. There were not results on this conjecture, other than the one dimensional case, until 2003 by Breuer . In this talk we will see the existence of a family of solutions indexed by a real number for the non-local problem with superlinear potential under a partial symmetry condition on the domain”
Venue: Sala de Seminarios John Von Neumann CMM, Beauchef 851, Torre Norte, Piso 7.
Speaker: Yasser Nanjarí Díaz
Affiliation: Universidad de Chile
Coordinator: Prof. Matteo Rizzi
Posted on Mar 20, 2019 in CAPDE, Differential Equations, Seminars