用逆散射变换求可积非局部逆时空五阶非线性Schrödinger方程的孤子解

IF 2.5 3区物理与天体物理 Q2 ACOUSTICS

Wave Motion Pub Date : 2025-08-12 DOI:10.1016/j.wavemoti.2025.103619

Huanhuan Lu

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引用次数: 0

摘要

本文首先推导了一个逆时空非局部五阶非线性Schrödinger （NLS）方程，该方程由相应的局部系统的一个简单而重要的对称约简而产生。在此基础上，基于已建立的Gelfand-Levitan-Marchenko （GLM）方程，构造了N孤子解的行列式。作为典型应用，导出了一些精确解，包括单孤子解、双孤子解和三孤子解。通过图形分析，进一步探讨了这些解的动力学性质，并将其可视化。此外，通过提出一个无限的守恒密度集，建立了方程的可积性。特别值得注意的是，我们还提出了三孤子解的表达式，这是该领域前所未有的成就。

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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The soliton solutions for an integrable nonlocal reverse space–time fifth-order nonlinear Schrödinger equation by the inverse scattering transform

This paper begins by deducing a reverse space–time nonlocal fifth-order nonlinear Schrödinger (NLS) equation, which arises from a simple yet significant symmetry reduction of the corresponding local system. Following this, the determinant form of

N

soliton solutions is thoroughly constructed based on established Gelfand–Levitan–Marchenko(GLM) equation. As a typical application, some exact solutions are derived, including one-soliton, two-soliton, and three-soliton solutions. The dynamical properties of these solutions are further explored and visualized through graphical analysis. Moreover, the integrability of the equation is established by presenting an infinite set of conserved densities. It is particularly noteworthy that we also present the expression for the three-soliton solution, which represents an unprecedented achievement in this field.

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来源期刊

Wave Motion 物理-力学

CiteScore

4.10

自引率

8.30%

发文量

118

审稿时长

3 months

期刊介绍： Wave Motion is devoted to the cross fertilization of ideas, and to stimulating interaction between workers in various research areas in which wave propagation phenomena play a dominant role. The description and analysis of wave propagation phenomena provides a unifying thread connecting diverse areas of engineering and the physical sciences such as acoustics, optics, geophysics, seismology, electromagnetic theory, solid and fluid mechanics. The journal publishes papers on analytical, numerical and experimental methods. Papers that address fundamentally new topics in wave phenomena or develop wave propagation methods for solving direct and inverse problems are of interest to the journal.