English

On the anisotropic hyperdissipative Navier-Stokes equations

Analysis of PDEs 2013-10-11 v1

Abstract

We consider the global Cauchy problem for the generalized incompressible Navier- Stokes system in 3D whole space ut+uu+p=Ahu, u_t+u\cdot\nabla u+\nabla p=\mathcal{A}_h u, \begin{equation}\label{main0} \nabla\cdot u=0, \end{equation} u(x,0)=u0(x), u(x,0)=u_0(x), where u=(u1,u2,u3)R3u=(u_1, u_2, u_3)\in\mathbf{R}^3 and p p are the fluid velocity field and pressure. The initial data u0(x)u_0(x) is assumed to be smooth, rapidly decreasing and divergence free. Here Ah\mathcal{A}_h is the anisotropic hyperdissipative operator. When Ahu=(Δ)5/4\mathcal{A}_hu=-(-\Delta)^{5/4}, it is called the critical case and the global smooth solution exists. We consider the anisotropic operator with Ahu=(x1x1u1+x2x2u1M32αu1partialx1x1u2+x2x2u2M32αu2 M12γu3M22γu3M32αu3).\mathcal{A}_hu= \left(\begin{array}{c} \partial_{x_1x_1} u_1+\partial_{x_2x_2} u_1- M_3^{2\alpha} u_1 \\partial_{x_1x_1} u_2+\partial_{x_2x_2} u_2-M_3^{2\alpha} u_2 \ - M_1^{2\gamma} u_3-M_2^{2\gamma} u_3-M_3^{2\alpha} u_3 \end{array} \right). and establish global regularity.

Keywords

Cite

@article{arxiv.1310.2859,
  title  = {On the anisotropic hyperdissipative Navier-Stokes equations},
  author = {X-J Wang},
  journal= {arXiv preprint arXiv:1310.2859},
  year   = {2013}
}
R2 v1 2026-06-22T01:44:18.923Z