Local regularity of weak solutions of the hypodissipative Navier-Stokes equations

Abstract

We consider the 3D incompressible hypodissipative Navier-Stokes equations, when the dissipation is given as a fractional Laplacian (- )s for s∈ (34,1), and we provide a new bootstrapping scheme that makes it possible to analyse weak solutions locally in space-time. This includes several homogeneous Kato-Ponce type commutator estimates which we localize in space, and which seems applicable to other parabolic systems with fractional dissipation. We also provide a new estimate on the pressure, \|(-)s p \|H1 \| (- ) s2 u \|2L2. We apply our main result to prove that any suitable weak solution u satisfies ∇n u ∈ Lp,∞ loc(R3×(0,∞)) for p=2(3s-1)n+2s-1, n=1,2. As a corollary of our local regularity theorem, we improve the partial regularity result of Tang-Yu [Comm. Math. Phys., 334(30), 2015, pp. 1455--1482], and obtain an estimate on the box-counting dimension of the singular set S, dB(S \t≥ t0 \ )≤ 13 (15-2s-8s2) for every t0>0.