Entwining Yang-Baxter maps over Grassmann algebras

P. Adamopoulou, G. Papamikos
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引用次数: 0

Abstract

We construct novel solutions to the set-theoretical entwining Yang-Baxter equation. These solutions are birational maps involving non-commutative dynamical variables which are elements of the Grassmann algebra of order $n$. The maps arise from refactorisation problems of Lax supermatrices associated to a nonlinear Schr\"odinger equation. In this non-commutative setting, we construct a spectral curve associated to each of the obtained maps using the characteristic function of its monodromy supermatrix. We find generating functions of invariants (first integrals) for the entwining Yang-Baxter maps from the moduli of the spectral curves. Moreover, we show that a hierarchy of birational entwining Yang-Baxter maps with commutative variables can be obtained by fixing the order $n$ of the Grassmann algebra. We present the members of the hierarchy in the case $n=1$ (dual numbers) and $n=2$, and discuss their dynamical and integrability properties, such as Lax matrices, invariants, and measure preservation.
Grassmann代数上的缠绕Yang-Baxter映射
本文构造了集论盘绕杨-巴克斯特方程的新解。这些解是包含非交换动态变量的双区映射,这些变量是阶$n$的Grassmann代数的元素。这些映射是由与非线性Schr\ odinger方程相关的Lax超矩阵重构问题引起的。在这种非交换设置中,我们使用其单一性超矩阵的特征函数构造与每个获得的映射相关联的谱曲线。我们从谱曲线的模中找到了缠绕杨-巴克斯特映射的不变量(第一积分)的生成函数。此外,我们还证明了通过固定Grassmann代数的阶$n$,可以得到具有交换变量的两国纠缠Yang-Baxter映射的层次结构。给出了对偶数$n=1$和$n=2$的层次结构的成员,并讨论了它们的动态性质和可积性,如Lax矩阵、不变量和测度保持性。
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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