Diffusion-free boundary conditions for the Navier-Stokes equations

TL;DR

This paper analyzes diffusion-free boundary conditions for the Navier-Stokes equations, showing they ensure well-posedness and reduce boundary layer effects, aiding numerical simulations of nearly inviscid flows.

Contribution

It provides a mathematical foundation for diffusion-free boundary conditions, demonstrating their well-posedness and effectiveness in minimizing boundary layers in Navier-Stokes solutions.

Findings

Well-posedness of Navier-Stokes with diffusion-free conditions

Boundary layer amplitude scales with viscosity, much lower than standard conditions

Conditions are suitable for numerical simulations of nearly inviscid flows

Abstract

We provide a mathematical analysis of the `diffusion-free' boundary conditions recently introduced by Lin and Kerswell for the numerical treatment of inertial waves in a fluid contained in a rotating sphere. We consider here the full setting of the nonlinear Navier-Stokes equation in a general bounded domain $\Omega$ of $\mathbb{R}^d$, $d=2$ or $3$. We show that diffusion-free boundary conditions $$ \Delta u \cdot \tau \vert_{\partial \Omega} = 0, \quad u \cdot n\vert_{\partial \Omega} = 0 \quad \text{ when } d=2, $$ $$ \Delta u \times n\vert_{\partial \Omega} = 0, \quad u \cdot n\vert_{\partial \Omega} = 0 \quad \text{ when } d=3, $$ allow for a satisfactory well-posedness theory of the full Navier-Stokes equations (global in time for $d=2$, local for $d=3$). Moreover, we perform a boundary layer analysis in the limit of vanishing viscosity $\nu \rightarrow 0$. We establish that the amplitude of the boundary layer flow is in this case of order $\nu$, i.e. much lower than in the case of standard Dirichlet or even stress-free conditions. This confirms analytically that this choice of boundary conditions may be used to reduce diffusive effects in numerical studies relying on the Navier-Stokes equation to approach nearly inviscid solutions.