Inverse scattering transform for continuous and discrete space-time shifted integrable equations

Mark J. Ablowitz, Ziad H. Musslimani, Nicholas J. Ossi
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Abstract

Nonlocal integrable partial differential equations possessing a spatial or temporal reflection have constituted an active research area for the past decade. Recently, more general classes of these nonlocal equations have been proposed, wherein the nonlocality appears as a combination of a shift (by a real or a complex parameter) and a reflection. This new shifting parameter manifests itself in the inverse scattering transform (IST) as an additional phase factor in an analogous way to the classical Fourier transform. In this paper, the IST is analyzed in detail for several examples of such systems. Particularly, time, space, and space-time shifted nonlinear Schr\"odinger (NLS) and space-time shifted modified Korteweg-de Vries (mKdV) equations are studied. Additionally, the semi-discrete IST is developed for the time, space and space-time shifted variants of the Ablowitz-Ladik integrable discretization of the NLS. One soliton solutions are constructed for all continuous and discrete cases.
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连续和离散时空移动可积分方程的反散射变换
过去十年来,具有空间或时间反射的非局部可积分偏微分方程一直是一个活跃的研究领域。最近,有人提出了这些非局部方程的更一般类别,其中的非局部性表现为移动(通过等值或复数参数)和反射的组合。这种新的位移参数在反向散射变换(IST)中以类似于经典傅立叶变换的方式作为附加相位因子表现出来。本文详细分析了此类系统的几个例子,特别是研究了时间、空间和时空偏移的非线性薛定谔方程(NLS)和时空偏移的修正 Korteweg-de Vries(mKdV)方程。构建了所有连续和离散情况下的一孤子解。
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