A strengthening of the energy inequality for the Leray-Hopf solutions of the 3D periodic Navier-Stokes equations

Abstract

In present note we establish the following inequality for the the Leray-Hopf solutions of the 3-D -periodic Navier-Stokes Equations: \[φ(|u(t)|2)-φ(|u(t0)|2) 2∫t0tφ'(|u(τ)|2) [-|A1/2u(τ)|2+(g(τ),u(τ))]\,dτ\] for all t0 Leray-Hopf points, t t0, and φ:R+ is an absolutely continouos non-decreasing function with bounded derivative. %with φ'()0 for all >0. Here (·,·) and |·| is correspondingly the L2 inner product and the L2 norm on , and A is the Stokes operator.