Extended symmetry of higher Painlevé equations of even periodicity and their rational solutions

arXiv - PHYS - Exactly Solvable and Integrable Systems Pub Date : 2024-09-05 DOI:arxiv-2409.03534

Henrik Aratyn, José Francisco Gomes, Gabriel Vieira Lobo, Abraham Hirsz Zimerman

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Abstract

The structure of the extended affine Weyl symmetry group of higher Painlev\'e equations with periodicity $N$ varies depending on whether $N$ is even or odd. For even $N$, the symmetry group ${\widehat A}^{(1)}_{N-1}$ includes not only the conventional B\"acklund transformations $s_j, j=1,{\ldots},N$, and the group of automorphisms consisting of cycling permutations but also incorporates %encompasses an additional expansion of the group of automorphisms by embedding %featuring in this group the reflections on a periodic circle of $N$ points. This latter aspect is a novel feature revealed in this paper. The presence of reflection automorphisms is linked to the existence of degenerated solutions. Specifically, for $N=4$ we explicitly demonstrate how the reflection automorphisms around even points induce degeneracy in a class of rational solutions obtained on the orbit of translation operators of ${\widehat A}^{(1)}_{3}$. We provide closed-form expressions for both the solutions and their degenerated counterparts, given in terms of determinants of Kummer polynomials.

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偶周期性高潘列维方程的扩展对称性及其有理解

具有周期性 $N$ 的高级 Painlev\'eequations 的扩展仿射韦尔对称群的结构因 $N$ 是偶数还是奇数而异。对于偶数$N$，对称群${\widehat A}^{(1)}_{N-1}$ 不仅包括传统的B（acklund）变换$s_j, j=1,{\ldots},N$，以及由循环排列组成的自形群，而且还包%括了自形群的额外扩展，即在该群中嵌入%包含$N$点的周期圆上的反射。后一方面是本文揭示的一个新特征。反射自形的存在与退化解的存在有关。具体地说，对于 $N=4$，我们明确地证明了偶数点周围的反射自动态如何诱导在 ${\widehatA}^{(1)}_{3}$ 的平移算子轨道上得到的一类有理解的退化。我们用库默波项式的行列式给出了这些解及其退化对应解的闭式表达式。

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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arXiv - PHYS - Exactly Solvable and Integrable Systems

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