Asymptotic equivalence of the linear Navier-Stokes and heat equations in one dimension

## Abstract We show for the three‐dimensional initial‐boundary value problem of the NAVIER‐STOKES and KELVIN‐VOIGT equation over bounded domains and for the corresponding stationary problem the existence of weak solutions in intermediate spaces between some of the usual spaces for weak solutions of

## Abstract We consider the problem of the asymptotic behaviour in the __L__^2^‐norm of solutions of the Navier–Stokes equations. We consider perturbations to the rest state and to stationary motions. In both cases we study the initial‐boundary value problem in unbounded domains with non‐compact bo

A new computational code for the numerical integration of the three-dimensional Navier -Stokes equations in their non-dimensional velocity-pressure formulation is presented. The system of non-linear partial differential equations governing the time-dependent flow of a viscous incompressible fluid in

In this paper we test several different formulas for the computation of the exact vorticity and angular velocity in certain radially symmetric solutions of the twodimensional Navier-Stokes equation in vorticity-stream function form. The class of initial conditions for the vorticity considered here h

## Abstract This paper deals with the non‐stationary incompressible Navier‐‐Stokes equations for two‐dimensional flows expressed in terms of the velocity and pressure and of the vorticity and streamfunction. The equivalence of the two formulations is demonstrated, both formally and rigorously, by v