On the sharpness of bounds on the rate of growth of Lebesgue norms of the velocity in Navier-Stokes flows
Abstract
In this paper we consider solutions u of the three-dimensional Navier-Stokes system and investigate sharpness of the a priori bound align* ddt\|u\|qq ≤ C\|u\|qqq-1q-3, q > 3. align* This bound is closely related to the Ladyzhenskaya-Prodi-Serrin conditions characterizing classical solutions of the Navier-Stokes system. Velocity fields maximizing the rate of growth (d/dt)\|u\|qq under certain constraints are found as solutions of a suitable optimization problem which is solved numerically using a Riemannian conjugate gradient approach. The results obtained for different q and increasing values of \|u\|q indicate that the bound is indeed sharp, up to a numerical prefactor, and therefore cannot be fundamentally improved. Additionally, the results also suggest that the rate of growth (d/dt)\|u\|qq diverges as q 3.
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