On almost sure well-posedness for certain dispersive PDE

Gigliola Staffilani (MIT)

01-Jun-2021, 14:00-15:00 (3 years ago)

Abstract: In this talk we summarize some of the many almost sure well-posedness results proved in recent years for dispersive equations. This study goes back to the work of Bourgain on invariant Gibbs measures and continued with the applications and evolution of his original ideas to address the question of local and global well-posedness for equations that are in a sense “supercritical”. If time permits we will also present some results for stochastic NLS equations, a direction of research started by de Bouard and Debussche.

analysis of PDEsprobability

Audience: researchers in the discipline


Stochastic PDEs and their friends

Series comments: We are organizing a three day online workshop devoted to recent developments in SPDEs and related topics. Please complete the registration form at forms.gle/G9Xw942iVNNgB4SLA if you would like to take part in the conference.

Confirmed speakers:

Yuri BAKHTIN (NYU)

Ajay CHANDRA (Imperial)

Dan CRISAN (Imperial)

Nina HOLDEN (ETH Zurich)

Kostantin KHANIN (U Toronto)

Davar KHOSHNEVISAN (University of Utah)

Nicolai KRYLOV (University of Minnesota)

Jonathan MATTINGLY (Duke)

Leonid MYTNIK (Technion)

Nicolas PERKOWSKI (Free U Berlin)

Ellen POWELL (Durham University)

Jeremy QUASTEL (U Toronto)

Daniel REMENIK (Universidad de Chile)

Armen SHIRIKYAN (University of Cergy-Pontoise)

Gigliola STAFFILANI (MIT)

Organizers: Oleg Butkovsky*, Peter Friz, Nikolas Tapia*
*contact for this listing

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