The generalized Kupershmidt deformation for constructing new discrete integrable systems

Huang Y.; Lin R.; Yao Y.; Zeng Y.

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The generalized Kupershmidt deformation for constructing new discrete integrable systems

机译：用于构造新的离散可积系统的广义Kupershmidt变形

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It is known that the KdV6 equation can be represented as the Kupershmidt deformation of the KdV equation. We propose a generalized Kupershmidt deformation for constructing new discrete integrable systems starting from the bi-Hamiltonian structure of a discrete integrable system. We consider the Toda, Kac-van Moerbeke, and Ablowitz-Ladik hierarchies and obtain Lax representations for these new deformed systems. The generalized Kupershmidt deformation provides a new way to construct discrete integrable systems.

机译：众所周知，KdV6方程可以表示为KdV方程的Kupershmidt变形。我们提出了一个广义的Kupershmidt变形，用于从离散可积系统的双哈密顿结构开始构造新的离散可积系统。我们考虑了Toda，Kac-van Moerbeke和Ablowitz-Ladik层次结构，并获得了这些新变形系统的Lax表示。广义的Kupershmidt变形提供了一种构造离散可积系统的新方法。

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《Theoretical and mathematical physics》 |2013年第2期|共13页
作者
Huang Y.; Lin R.; Yao Y.; Zeng Y.;
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原文格式 PDF
正文语种 eng
中图分类 53.31;
关键词
bi-Hamiltonian system; discrete integrable system; Kupershmidt deformation;

机译：双哈密顿系统;离散可积系统;Kupershmidt变形;

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专利

1. The generalized Kupershmidt deformation for constructing new discrete integrable systems [J] . Huang Y., Lin R., Yao Y., Theoretical and mathematical physics . 2013,第2期

机译：用于构造新的离散可积系统的广义Kupershmidt变形
2. Based on the matrix Lie superalgebras and supertrace identity, the integrable super Broer-Kaup-Kupershmidt hierarchy with self-consistent sources is established. Furthermore, we establish the infinitely many conservation laws for the integrable super Broer-Kaup-Kupershmidt hierarchy. In the process of computation especially, Fermi variables also play an important role in super integrable systems. [J] . Hanyu Wei, Tiecheng Xia Journal of applied mathematics . 2013,第Pta4期

机译：基于矩阵李超代数和超迹恒等式，建立了具有自洽源的可积超级Broer-Kaup-Kupershmidt层次结构。此外，我们为可集成的超级Broer-Kaup-Kupershmidt层次建立了无限多的守恒律。特别是在计算过程中，费米变量在超可积系统中也起着重要作用。
3. Integrability of kupershmidt deformations [J] . Kersten P.H.M., KrasilShchik I.S., Verbovetsky A.M., Acta Applicandae Mathematicae: An International Journal on Applying Mathematics and Mathematical Applications . 2010,第1期

机译：kupershmidt变形的可积性
4. Performance Analysis of a Continuous and Discretized Second Order Generalized Integrator based Phase Lock Loop for Single Phase Grid Connected PV Systems [C] . Hassan Zahid Butt, Muhammad Awon, Hassan Abdullah Khalid International Conference on Power Generation Systems and Renewable Energy Technologies . 2018

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5. Studies on Discrete and q-Discrete Nonlinear Integrable Systems利用統計を見る [D] . Kajiwara Kenji 1994

机译：离散和q离散非线性可积系统研究查看使用情况统计
6. Generalized Detectability for Discrete Event Systems [O] . Shaolong Shu, Feng Lin -1

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7. The generalized Kupershmidt deformation for constructing new discrete integrable systems [O] . Yehui Huang A, Runliang Lin B, Yuqin Yao C, 2016

机译：构造新离散可积系统的广义Kupershmidt变形
8. Dimensional Deformations of Integrable Systems: An Approach to Integrability in Multidimensions, Part 1 [R] . Santini, P. M. 1988

机译：可积系统的维数变形：多维可积性的一种方法，第1部分

The generalized Kupershmidt deformation for constructing new discrete integrable systems

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