Local well-posedness for the derivative nonlinear Schr\"odinger equation with nonvanishing boundary conditions

Abstract

We consider the derivative nonlinear Schr\"odinger equation on the real line, with a background function (t,x)∈ L∞(R2) that satisfies suitable conditions. Such a function may, for example, be a non-decaying solution of the equation, such as a dark soliton. By developing the energy method with correction terms, we prove that the Cauchy problem for perturbations around such an L∞ function is unconditionally locally well-posed in Hs(R) for s>3/4 . As a byproduct, we also establish local well-posedness in the Zhidkov space.