Dynamic stability of the three-dimensional axisymmetric Navier-Stokes equations with swirl

## Abstract In this paper we derive a probabilistic representation of the deterministic three‐dimensional Navier‐Stokes equations based on stochastic Lagrangian paths. The particle trajectories obey SDEs driven by a uniform Wiener process; the inviscid Weber formula for the Euler equations of ideal

## Abstract The quaternionic calculus is a powerful tool for treating the Navier–Stokes equations very elegantly and in a compact form, through the evaluation of two types of integral operators: the Teodorescu operator and the quaternionic Bergman projector. While the integral kernel of the Teodore

This paper examines the stability of nontrivial regular solutions to the Navier Stokes equations on a three dimensional torus. It is shown that the W 2, 1 r -norm of the perturbation can be controlled if its initial data are small enough in the L 2 -norm. A key element of the proof is to apply the M

## Abstract This paper is devoted to some mathematical questions related to the three‐dimensional stationary Navier–Stokes equations. Our approach is based on a combination of properties of Oseen problems in ℝ^3^. Copyright © 2008 John Wiley & Sons, Ltd.