Graduate Analysis Seminar
Trevor Leslie
UIC
Energy Balance Criteria for the Navier-Stokes Equations
Abstract: Let $u$ be a solution to the classical 3D Navier-Stokes equations.
If $u$ is smooth, then we know that $u$ satisfies a certain energy balance relation.
But what if $u$ is not smooth? It has been known since the 1960s (by a result of Lions)
that $u$ satisfies the energy balance relation if $u$ is $L^4$ integrable in
both time and space. We give new regularity conditions on $u$ that guarantee
energy balance; our conditions depend on both the integrability of $u$ and
the Hausdorff dimension $d$ of the singularity set. We recover Lions' result when $d=1$
and improve upon it when $d<1$ or when the singularity set is confined to a single time-slice.
This is joint work with Roman Shvydkoy.
Monday October 31, 2016 at 12:00 PM in SEO 1227