Using periodic boundary conditions to approximate the Navier-Stokes equations on R3 and the transfer of regularity

Abstract

This paper considers solutions uα of the three-dimensional Navier--Stokes equations on the periodic domains Qα:=(-α,α)3 as the domain size α∞, and compares them to solutions of the same equations on the whole space. For compactly-supported initial data uα0∈ H1(Qα), an appropriate extension of uα converges to a solution u of the equations on R3, strongly in Lr(0,T;H1( R3)), r∈[1,∞). The same also holds when uα0 is the velocity corresponding to a fixed, compactly-supported vorticity. A consequence is that if an initial compactly-supported velocity u0∈ H1( R3) or an initial compactly-supported vorticity ω0∈ H1( R3) gives rise to a smooth solution on [0,T*] for the equations posed on R3, a smooth solution will also exist on [0,T*] for the same initial data for the periodic problem posed on Qα for α sufficiently large; this illustrates a `transfer of regularity' from the whole space to the periodic case.