Local well-posedness for the gKdV equation on the background of a bounded function

Abstract

We prove the local well-posedness for the generalized Korteweg-de Vries equation in Hs(R), s>1/2, under general assumptions on the nonlinearity f(x), on the background of an L∞t,x-function (t,x), with (t,x) satisfying some suitable conditions. As a consequence of our estimates, we also obtain the unconditional uniqueness of the solution in Hs(R). This result not only gives us a framework to solve the gKdV equation around a Kink, for example, but also around a periodic solution, that is, to consider localized non-periodic perturbations of a periodic solution. As a direct corollary, we obtain the unconditional uniqueness of the gKdV equation in Hs(R) for s>1/2. We also prove global existence in the energy space H1(R), in the case where the nonlinearity satisfies that f''(x) 1.