Exact Solutions for Restricted Incompressible Navier--Stokes Equations with Dirichlet Boundary Conditions

Abstract

This paper exposes how to obtain a relation that have to be hold for all free--divergence velocity fields that evolve according to Navier--Stokes equations. However, checking the violation of this relation requires a huge computational effort. To circumvent this problem it is proposed an additional antsatz to free-divergent Navier--Stokes fields. This makes available six degrees of freedom which can be tuned. When they are tuned adequately, it is possible to find finite L2 norms of the velocity field for volumes of R3 and for t∈[t0,∞). In particular, the kinetic energy of the system is bounded when the field components ui are class C3 functions on R3×[t0,∞) that hold Dirichlet boundary conditions. This additional relation lets us conclude that Navier--Stokes equations with no-slip boundary conditions have not unique solution. Moreover, under a given external force the kinetic energy can be computed exactly as a funtion of time.