Title: Multi-solitons in nonlinear Schrödinger equations.
Speaker: Stefan Le Coz
Abstract: The soliton resolution conjecture asserts that any global solution of the nonlinear Schrödinger equations decomposes in large time into a sum of solitons and a dispersive remainder. We will start by reviewing briefly the history of the discovery of solitons and multi-solitons. We will then illustrate the soliton resolution conjecture on a toy model. Finally, we will present various results that are milestones towards a proof of this conjecture: soliton stability, existence and stability of multi-solitons.
Coffee will be served in the same room – HH 305 at 3pm – all are welcome.
