Sharp nonuniqueness for the Navier-Stokes equations

Abstract

In this paper, we prove a sharp nonuniqueness result for the incompressible Navier-Stokes equations in the periodic setting. In any dimension d ≥ 2 and given any p<2, we show the nonuniqueness of weak solutions in the class Lpt L∞, which is sharp in view of the classical Ladyzhenskaya-Prodi-Serrin criteria. The proof is based on the construction of a class of non-Leray-Hopf weak solutions. More specifically, for any p<2, q<∞, and >0, we construct non-Leray-Hopf weak solutions u ∈ Lpt L∞ L1t W1,q that are smooth outside a set of singular times with Hausdorff dimension less than . As a byproduct, examples of anomalous dissipation in the class L 3/2 - t C 1/3 are given in both the viscous and inviscid case.