非标微分方程的积分性:对称方法

Vladimir Novikov, Jing Ping Wang
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引用次数: 0

摘要

我们提出了一种新方法来解决自由关联代数上的演化微分差分方程(D$\Delta$Es)的可整性问题,这种方程也被称为非阿贝尔D$\Delta$Es。这种方法使我们能够推导出必要的可整性条件,确定给定方程的可整性,并在可整性非阿贝尔D$$\Delta$Es的分类方面取得进展。这项工作包括为非标注差分代数、差分算子和形式数列建立符号表示,以及在符号表示的背景下为形式数列代数引入新的准局部扩展。应用这一形式主义,我们解决了阶$(-1,1)$、$(-2,2)$和$(-3,3)$的可积分偏对称准线性非阿贝尔方程的分类问题,并在此过程中揭示了一些新方程。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Integrability of Nonabelian Differential-Difference Equations: the Symmetry Approach
We propose a novel approach to tackle integrability problem for evolutionary differential-difference equations (D$\Delta$Es) on free associative algebras, also referred to as nonabelian D$\Delta$Es. This approach enables us to derive necessary integrability conditions, determine the integrability of a given equation, and make progress in the classification of integrable nonabelian D$\Delta$Es. This work involves establishing symbolic representations for the nonabelian difference algebra, difference operators, and formal series, as well as introducing a novel quasi-local extension for the algebra of formal series within the context of symbolic representations. Applying this formalism, we solve the classification problem of integrable skew-symmetric quasi-linear nonabelian equations of orders $(-1,1)$, $(-2,2)$, and $(-3,3)$, consequently revealing some new equations in the process.
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