Forward Self-Similar Solutions to the 2D Hypodissipative Navier-Stokes Equations

Abstract

We study the forward self-similar solutions to the 2D hypodissipative Navier-Stokes equation with fractional diffusion (-Δ)α for 12<α<1. We first show that for arbitrarily large (1-2α)-homogeneous initial data which are locally Lipschitz, there exists at least one weak solution whose profile differs from the self-similar profile of the fractional heat equation by an element of Hα(2). Moreover, when α∈(23,1) we show that any such weak solution is actually smooth, hence a strong solution, and satisfies certain far field decay estimates. Finally, we provide numerical evidence for the nonuniqueness of the related 2D Navier-Stokes equation with time-dependent viscosity.