On a Type I singularity condition in terms of the pressure for the Euler equations in R3

Abstract

We prove a blow up criterion in terms of the Hessian of the pressure of smooth solutions u∈ C([0, T); W2,q ( R3)), q>3 of the incompressible Euler equations. We show that a blow up at t=T happens only if ∫0 T ∫0 t \∫0 s \|D2 p (τ)\|L∞ dτ ( ∫s t ∫0 \|D2 p (τ)\|L∞ dτ d ) \dsdt \, = +∞. As consequences of this criterion we show that there is no blow up at t=T if \|D2 p(t)\|L∞ c(T-t)2 with c<1 as t T. Under the additional assumption of ∫0 T \|u(t)\|L∞ (B(x0, )) dt <+∞, we obtain localized versions of these results.