Global Regularity of weak solutions to the generalized Leray equations and its applications

TL;DR

This paper proves regularity and decay estimates for weak solutions of a generalized Leray equation related to self-similar Navier-Stokes solutions, using fractional diffusion and non-local analysis techniques.

Contribution

It establishes new regularity results and pointwise decay estimates for solutions of the generalized Leray equations, advancing understanding of self-similar Navier-Stokes solutions.

Findings

Uniform estimates in weighted Hilbert spaces

Improved regularity from fractional diffusion analysis

Optimal decay estimates for self-similar solutions

Abstract

We investigate a regularity for weak solutions of the following generalized Leray equations \begin{equation*} (-\Delta)^{\alpha}V- \frac{2\alpha-1}{2\alpha}V+V\cdot\nabla V-\frac{1}{2\alpha}x\cdot \nabla V+\nabla P=0, \end{equation*} which arises from the study of self-similar solutions to the generalized Naiver-Stokes equations in $\mathbb R^3$. Firstly, by making use of the vanishing viscosity and developing non-local effects of the fractional diffusion operator, we prove uniform estimates for weak solutions $V$ in the weighted Hilbert space $H^\alpha_{\omega}(\mathbb R^3)$. Via the differences characterization of Besov spaces and the bootstrap argument, we improve the regularity for weak solution from $H^\alpha_{\omega}(\mathbb R^3)$ to $H_{\omega}^{1+\alpha}(\mathbb R^3)$. This regularity result, together linear theory for the non-local Stokes system, lead to pointwise estimates of $V$ which allow us to obtain a natural pointwise property of the self-similar solution constructed in \cite{LXZ}. In particular, we obtain an optimal decay estimate of the self-similar solution to the classical Naiver-Stokes equations by means of the special structure of Oseen tensor. This answers the question proposed by Tsai \cite[Comm. Math. Phys., 328 (2014), 29-44]{T}.