On the effect of external forces on incompressible fluid motions at large distances

Abstract

We study incompressible Navier--Stokes flows in~d with small and well localized data and external force~f. We establish pointwise estimates for large~|x| of the form ct|x|-d |u(x,t)| c't|x|-d, where ct>0 whenever ∫0t\!\!∫ f(x,s)\,dx\,ds= 0. This sharply contrasts with the case of the Navier--Stokes equations without force, studied in [Brandolese, Vigneron, J. Math. Pures Appl. 88, 64--86 (2007)], where the spatial asymptotic behavior was |u(x,t)| Ct|x|-d-1. In particular, this shows that external forces with non-zero mean, no matter how small and well localized (say, compactly supported in space-time), increase the velocity of fluid particles at all times~t and at at all points~x in the far-field. As an application of our analysis on the pointwise behavior, we deduce sharp upper and lower bounds of weighted Lp-norms for strong solutions, extending the results obtained in [Bae, Brandolese, Jin, Asymptotic behavior for the Navier--Stokes equations with nonzero external forces, Nonlinear analysis, doi:10.1016/j.na.2008.10.074] for weak solutions, by considering here a larger (and in fact, optimal) class of weight functions.