Potential well theory for the derivative nonlinear Schrödinger equation

arXiv: Analysis of PDEs Pub Date : 2020-11-16 DOI:10.2140/apde.2021.14.909

M. Hayashi

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引用次数: 8

Abstract

We consider the following nonlinear Schrodinger equation of derivative type: \begin{equation}i \partial_t u + \partial_x^2 u +i |u|^{2} \partial_x u +b|u|^4u=0 , \quad (t,x) \in \mathbb{R}\times\mathbb{R}, \ b \in\mathbb{R}. \end{equation} If $b=0$, this equation is known as a gauge equivalent form of well-known derivative nonlinear Schrodinger equation (DNLS), which is mass critical and completely integrable. The equation can be considered as a generalized equation of DNLS while preserving mass criticality and Hamiltonian structure. For DNLS it is known that if the initial data $u_0\in H^1(\mathbb{R})$ satisfies the mass condition $\| u_0\|_{L^2}^2 <4\pi$, the corresponding solution is global and bounded. In this paper we first establish the mass condition on the equation for general $b\in\mathbb{R}$, which is exactly corresponding to $4\pi$-mass condition for DNLS, and then characterize it from the viewpoint of potential well theory. We see that the mass threshold value gives the turning point in the structure of potential wells generated by solitons. In particular, our results for DNLS give a characterization of both $4\pi$-mass condition and algebraic solitons.

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势阱理论的导数nonlinearSchrödinger方程

我们考虑以下导数型非线性薛定谔方程:\begin{equation}i \partial_t u + \partial_x^2 u +i |u|^{2} \partial_x u +b|u|^4u=0 , \quad (t,x) \in \mathbb{R}\times\mathbb{R}, \ b \in\mathbb{R}. \end{equation}如果$b=0$，该方程被称为众所周知的导数型非线性薛定谔方程(DNLS)的规范等价形式，它是质量临界的，完全可积的。在保持质量临界性和哈密顿结构的前提下，该方程可视为DNLS的广义方程。对于DNLS，已知如果初始数据$u_0\in H^1(\mathbb{R})$满足质量条件$\| u_0\|_{L^2}^2 <4\pi$，其解是全局有界的。本文首先在一般的$b\in\mathbb{R}$方程上建立了与DNLS方程$4\pi$ -质量条件完全对应的质量条件，然后从势阱理论的角度对其进行了表征。我们看到，质量阈值给出了由孤子产生的势阱结构的转折点。特别地，我们的结果给出了$4\pi$ -质量条件和代数孤子的特征。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv: Analysis of PDEs

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