Sharp ill-posedness and well-posedness results for dissipative KdV equations on the real line

Abstract

This work is concerned about the Cauchy problem for the following generalized KdV- Burgers equation equation* \arrayl ∂tu+∂x3u+Lpu+u∂xu=0, u(0,\,x)=u0(x). array . equation* where Lp is a dissipative multiplicator operator. Using Besov-Bourgain Spaces, we establish a bilinear estimate and following the framework developed in Molinet, L. & Vento, S. (2011) we prove sharp global well-posedness in the Sobolev spaces H-p/2(I\!\!R) and sharp ill-posedness in Hs(I\!\!R) when s<-p/2 with p ≥ 2.