Quantitative transfer of regularity of the incompressible Navier-Stokes equations from R3 to the case of a bounded domain

Abstract

Let u0∈ C05 ( BR0) be divergence-free and suppose that u is a strong solution of the three-dimensional incompressible Navier-Stokes equations on [0,T] in the whole space R3 such that \| u \|L∞ ((0,T);H5 (R3 )) + \| u \|L∞ ((0,T);W5,∞ (R3 )) ≤ M <∞. We show that then there exists a unique strong solution w to the problem posed on BR with the homogeneous Dirichlet boundary conditions, with the same initial data and on the same time interval for R≥ (1+R0, C(a) C(M)1/a (CM4T/a)) ) for any a∈ [0,3/2), and we give quantitative estimates on u-w and the corresponding pressure functions.