KdV is wellposed in $H^{-1}$

TL;DR

This paper establishes the global well-posedness of the KdV equation for initial data in the $H^{-1}$ space, introducing a new method applicable to low-regularity integrable PDEs and extending previous results.

Contribution

It introduces a novel approach for low-regularity well-posedness of integrable PDEs, proving global well-posedness of KdV in $H^{-1}$ and related equations, with new proofs and extensions.

Findings

Proved global well-posedness of KdV in $H^{-1}$

Developed a new method for low-regularity analysis of integrable PDEs

Extended results to periodic KdV and 5th order KdV

Abstract

We prove global well-posedness of the Korteweg--de Vries equation for initial data in the space $H^{-1}(R)$. This is sharp in the class of $H^{s}(R)$ spaces. Even local well-posedness was previously unknown for $s<-3/4$. The proof is based on the introduction of a new method of general applicability for the study of low-regularity well-posedness for integrable PDE, informed by the existence of commuting flows. In particular, as we will show, completely parallel arguments give a new proof of global well-posedness for KdV with periodic $H^{-1}$ data, shown previously by Kappeler and Topalov, as well as global well-posedness for the 5th order KdV equation in $L^2(R)$. Additionally, we give a new proof of the a priori local smoothing bound of Buckmaster and Koch for KdV on the line. Moreover, we upgrade this estimate to show that convergence of initial data in $H^{-1}(R)$ guarantees convergence of the resulting solutions in $L^2_\text{loc}(R\times R)$. Thus, solutions with $H^{-1}(R)$ initial data are distributional solutions.