The supercritical generalized KdV equation: Global well-posedness in the energy space and below

Abstract

We consider the generalized Korteweg-de Vries (gKdV) equation ∂t u+∂x3u+μ∂x(uk+1)=0, where k≥5 is an integer number and μ=1. In the focusing case (μ=1), we show that if the initial data u0 belongs to H1() and satisfies E(u0)sk M(u0)1-sk < E(Q)sk M(Q)1-sk, E(u0)≥0, and \|∂x u0\|L2sk\|u0\|L21-sk < \|∂x Q\|L2sk\|Q\|L21-sk, where M(u) and E(u) are the mass and energy, then the corresponding solution is global in H1(). Here, sk=(k-4)2k and Q is the ground state solution corresponding to the gKdV equation. In the defocusing case (μ=-1), if k is even, we prove that the Cauchy problem is globally well-posed in the Sobolev spaces Hs(R), s>4(k-1)5k.