Existence, Uniqueness and Asymptotic Dynamics of Nonlinear Schr\"odinger Equations With Quasi-Periodic Initial Data: II. The Derivative NLS

TL;DR

This paper proves local existence, uniqueness, and asymptotic convergence of solutions for the derivative nonlinear Schr"odinger equation with quasi-periodic initial data, using Fourier analysis and combinatorial methods.

Contribution

It extends the analysis of quasi-periodic solutions to the derivative NLS, establishing local well-posedness and asymptotic behavior in a weakly nonlinear regime.

Findings

Existence of quasi-periodic solutions with exponential Fourier bounds.

Uniqueness of solutions within the class of quasi-periodic functions.

Asymptotic convergence to linear solutions as nonlinearity parameter tends to zero.

Abstract

This is the second part of a two-paper series studying the nonlinear Schr\"odinger equation with quasi-periodic initial data. In this paper, we focus on the quasi-periodic Cauchy problem for the derivative nonlinear Schr\"odinger equation. Under the assumption that the Fourier coefficients of the initial data obey an exponential upper bound, we establish local existence of a solution that retains quasi-periodicity in space with a slightly weaker Fourier decay. Moreover, the solution is shown to be unique within this class of quasi-periodic functions. Also, we prove that, for the derivative nonlinear Schr\"odinger equation in a weakly nonlinear setting, within the time scale, as the small parameter of nonlinearity tends to zero, the nonlinear solution converges asymptotically to the linear solution in the sense of both sup-norm and analytic Sobolev-norm. The proof proceeds via a consideration of an associated infinite system of coupled ordinary differential equations for the Fourier coefficients and an explicit combinatorial analysis for the Picard iteration with the help of Feynman diagrams and the power of $\ast^{[\cdot]}$ labelling the complex conjugate.