Unconditional uniqueness for the derivative nonlinear Schrödinger equation on the real line

Abstract

We prove the unconditional uniqueness of solutions to the derivative nonlinear Schrodinger equation (DNLS) in an almost end-point regularity. To this purpose, we employ the normal form method and we transform (a gauge-equivalent) DNLS into a new equation (the so-called normal form equation) for which nonlinear estimates can be easily established in \begin{document}$ H^s({\mathbb{R}}) $\end{document} , \begin{document}$ s>\frac12 $\end{document} , without appealing to an auxiliary function space. Also, we prove that low-regularity solutions of DNLS satisfy the normal form equation and this is done by means of estimates in the \begin{document}$ H^{s-1}({\mathbb{R}}) $\end{document} -norm.