Temporal decay rates for weak solutions of the Navier-Stokes Equations with supercritical fractional dissipation

Abstract

In this paper, we establish temporal decay for a weak solution u(x,t) (with initial data u0) of the Navier-Stokes equations with supercritical fractional dissipation α ∈ (0,54) in L2(R3) and Hs(R3) (s≤0). More precisely, we prove that u satisfies the following upper bound: \|u(t)\|22≤ C(1+t)-3-2p2α, ∀ t>0. This estimate leads us to show the next inequality: \|u(t)\|H-δ2≤ C(1+t)-3-2δ-2p2α, ∀ t>0. These results are obtained by applying standard Fourier Analysis and they hold for α∈(0,54), p∈[-1,32), δ∈ [0, 3-2p2) and u0∈ L2(R3) Yp(R3) (and also u0∈ L1(R3) for p=-1 and a certain finite set of values of α).