Exact solutions for restricted incompressible Navier-Stokes equations with Dirichlet boundary conditions

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 ansatz to free-divergence 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 L-2 norms of the velocity field for volumes of R-3 and for t is an element of[t(0), infinity). In particular, the kinetic energy of the system is bounded when the field components u(i) are class C-3 functions on R-3 x [t(0), infinity) 0 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.