时 间: 2022-03-15 18:00 — 19:00
Quantitative estimates of the Navier-Stokes equations often give useful information on the behaviours of potentially singular solutions.
In particular, Terence Tao recently used a new quantitative approach to infer that certain ‘slightly supercritical’ quantities for the Navier–Stokes equations must become unbounded near a potential blow-up time.
In this talk, I’ll discuss a new strategy for proving quantitative bounds for the Navier–Stokes equations, as well as applications to behaviours of potentially singular solutions. This talk is based upon joint work with Christophe Prange (CNRS, Cergy Paris Université).
(*Zoom Meeting ID: 919 637 6185; Passcode: 314159)