Rogue waves in a reverse space nonlocal nonlinear Schrödinger equation

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Xin Wang , Jingsong He
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引用次数: 0

Abstract

Rogue waves in a reverse space nonlocal nonlinear Schrödinger (NLS) equation with real and parity-symmetric nonlinearity-induced potential are considered. This equation has clear physical meanings since it can be derived from the Manakov system with a special reduction. The N-fold Darboux transformation and its generalized form for the nonlocal NLS equation are constructed. As an application, the multiparametric Nth-order rogue wave solution in terms of Schur polynomials for the nonlocal NLS equation with focusing case is derived by the limit technique. The significant differences of rogue wave dynamics between the nonlocal NLS equation and its usual (local) counterpart are illustrated through two types of specific rogue wave solutions. Unlike the eye-shaped (Peregrine type) rogue waves, the rogue wave doublets which involve an eye-shaped rogue wave and a dark/four-petaled rogue wave merging or separating with each other, and the rogue wave sextets that are characterized by the superpositions of three eye-shaped rogue waves and three dark/four-petaled rogue waves with fundamental, triangular and quadrilateral patterns are shown. Moreover, some wave characteristics including the difference between the light intensity and the plane-wave background, and the pulse energy of the rogue wave doublets are discussed.

反向空间非局部非线性薛定谔方程中的乱流波
研究考虑了反向空间非局域非线性薛定谔(NLS)方程中的流氓波,该方程具有实数和奇偶性对称的非线性诱导势。该方程具有明确的物理意义,因为它可以通过特殊的还原法从 Manakov 系统中导出。本文构建了非局部 NLS 方程的 N 折达布变换及其广义形式。作为应用,通过极限技术推导出了有聚焦情况下非局部 NLS 方程的舒尔多项式多参数 Nth 阶流氓波解。非局部 NLS 方程与通常(局部)NLS 方程的流氓波动力学之间的显著差异通过两类具体的流氓波求解得到了说明。与眼形(百灵鸟型)流氓波不同的是,流氓波双波涉及一个眼形流氓波和一个暗色/四瓣流氓波的相互合并或分离,而流氓波六波的特征是三个眼形流氓波和三个暗色/四瓣流氓波的叠加,具有基波、三角波和四边波的形态。此外,还讨论了一些波形特征,包括光强与平面波背景之间的差异,以及流氓波双联体的脉冲能量。
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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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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