Thursday, December 14, 2023 — 12:00 pm — aula M1.3, edificio Matematica
Invariant Gibbs dynamics for fractional wave equations in negative Sobolev spaces
Abstract: In this talk, we consider a fractional nonlinear wave equation with a general power-type nonlinearity (FNLW) on the two-dimensional torus. Our main goal is to construct invariant global-in-time Gibbs dynamics for FNLW. We first construct the Gibbs measure associated with this equation. By introducing a suitable renormalisation, we then prove almost sure local well-posedness with respect to Gibbsian initial data. Finally, we extend solutions globally in time by applying Bourgain’s invariant measure argument. This talk is based on a joint work with Luigi Forcella (University of Pisa).