Break-down criterion for the water-wave equation

Abstract

We study the break-down mechanism of smooth solution for the gravity water-wave equation of infinite depth. It is proved that if the mean curvature of the free surface t, the trace (V,B) of the velocity at the free surface, and the outer normal derivative P n of the pressure P satisfy &&t∈ [0,T]\|(t)\|Lp L2+∫0T\|( V, B)(t)\|L∞6dt<+∞, &∈f(t,x,y)∈ [0,T]× t- P n(t,x,y) c0, for some p>2d and c0>0, then the solution can be extended after t=T.