离散高阶非线性薛定谔方程的稳健反散射分析

Xue-Wei Yan, Yong Chen, Xin Wu
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摘要

在本研究中,我们提出了针对具有非零边界条件(NZBC)的离散高阶非线性薛定谔(HNLS)方程的鲁棒逆散射方法的严格理论。利用直接散射问题,我们推导出了约斯特解和散射矩阵的解析性、对称性和渐近行为。我们还利用矩阵黎曼-希尔伯特问题(RHP)提出了反向散射问题。此外,我们还利用环群理论,在鲁棒逆散射变换的框架内构建了多重达布变换(DT)。此外,我们还开发了相应的贝克伦德变换(BT),以获得多阶晶格孤子解。为了得出高阶有理解,我们进一步构建了高阶 DT。最后,我们从理论和图形上分析了这些解,它们表现出晶格呼吸波、W 形晶格孤子、高阶晶格流氓波(RW)以及它们之间的相互作用。
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Robust inverse scattering analysis of discrete high-order nonlinear Schrödinger equation
In this study, we present the rigorous theory of the robust inverse scattering method for the discrete high-order nonlinear Schrödinger (HNLS) equation with a nonzero boundary condition (NZBC). Using the direct scattering problem, we deduce the analyticity, symmetries, and asymptotic behaviors of the Jost solutions and scattering matrix. We also formulate the inverse scattering problem using the matrix Riemann–Hilbert problem (RHP). Furthermore, utilizing the loop group theory, we construct the multi-fold Darboux transformation (DT) within the framework of the robust inverse scattering transform. Additionally, we develop the corresponding Bäcklund transformation (BT) to obtain the multi-fold lattice soliton solutions. To derive the high-order rational solutions, we further construct the high-order DT. Finally, we theoretically and graphically analyze these solutions, which exhibit lattice breather waves, W-shape lattice solitons, high-order lattice rogue waves (RW), and their interactions.
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