Global well-posedness for H-1(R) perturbations of KdV with exotic spatial asymptotics

Abstract

Given a suitable solution V(t,x) to the Korteweg--de Vries equation on the real line, we prove global well-posedness for initial data u(0,x) ∈ V(0,x) + H-1(R). Our conditions on V do include regularity but do not impose any assumptions on spatial asymptotics. We show that periodic profiles V(0,x) ∈ H5(R/Z) satisfy our hypotheses. In particular, we can treat localized perturbations of the much-studied periodic traveling wave solutions (cnoidal waves) of KdV. In our companion paper we show that smooth step-like initial data also satisfy our hypotheses. We employ the method of commuting flows introduced by Killip and Visan; in the special case V 0, we recover their sharp H-1(R) result.