Large x $x$ Asymptotics of the Soliton Gas for the Nonlinear Schrödinger Equation

IF 2.6 2区数学 Q1 MATHEMATICS, APPLIED

Studies in Applied Mathematics Pub Date : 2025-02-21 DOI:10.1111/sapm.70027

Xiaofeng Han, Xiaoen Zhang, Huanhe Dong

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引用次数: 0

Abstract

In this paper, we construct a Riemann–Hilbert problem of the soliton gas for the nonlinear Schrödinger equation, derived by taking the limit of the $n$ soliton solutions as $n \to \infty$ . The discrete spectra corresponding to the soliton solutions are located in four disjoint intervals on the imaginary axis, which are symmetric about the real axis. We analyze the large $x$ asymptotics by setting the time variable $t$ to zero. Using the Deift–Zhou nonlinear steepest-descent method, we find that the large $x$ asymptotics at $t = 0$ behave differently, as $x \to \infty$ , the asymptotics decays to the zero background exponentially, while as $x \to - \infty$ , the leading-order term can be expressed with a Riemann-theta function of genus three. In the conclusion, we expand this case to the general $N$ intervals and conjecture on the large $x$ asymptotics.

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来源期刊

Studies in Applied Mathematics 数学-应用数学

CiteScore

4.30

自引率

3.70%

发文量

审稿时长

>12 weeks

期刊介绍： Studies in Applied Mathematics explores the interplay between mathematics and the applied disciplines. It publishes papers that advance the understanding of physical processes, or develop new mathematical techniques applicable to physical and real-world problems. Its main themes include (but are not limited to) nonlinear phenomena, mathematical modeling, integrable systems, asymptotic analysis, inverse problems, numerical analysis, dynamical systems, scientific computing and applications to areas such as fluid mechanics, mathematical biology, and optics.