Forward self-similar solutions of the fractional Navier-Stokes Equations

Abstract

We study forward self-similar solutions to the 3-D Navier-Stokes equations with the fractional diffusion (-)α. First, we construct a global-time forward self-similar solutions to the fractional Navier-Stokes equations with 5/6<α≤1 for arbitrarily large self-similar initial data by making use of the so called blow-up argument. Moreover, we prove that this solution is smooth in R3× (0,+∞). In particular, when α=1, we prove that the solution constructed by Korobkov-Tsai [Anal. PDE 9 (2016), 1811-1827] satisfies the decay estimate by establishing regularity of solution for the corresponding elliptic system, which implies this solution has the same properties as a solution which was constructed in [Jia and Sver\'ak, Invent. Math. 196 (2014), 233-265].