Rational solutions of Painlevé systems.

D. Gómez‐Ullate, Y. Grandati, R. Milson
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引用次数: 1

Abstract

Although the solutions of Painleve equations are transcendental in the sense that they cannot be expressed in terms of known elementary functions, there do exist rational solutions for specialized values of the equation parameters. A very successful approach in the study of rational solutions to Painleve equations involves the reformulation of these scalar equations into a symmetric system of coupled, Riccati-like equations known as dressing chains. Periodic dressing chains are known to be equivalent to the $A_N$-Painleve system, first described by Noumi and Yamada. The Noumi-Yamada system, in turn, can be linearized as using bilinear equations and $\tau$-functions; the corresponding rational solutions can then be given as specializations of rational solutions of the KP hierarchy. The classification of rational solutions to Painleve equations and systems may now be reduced to an analysis of combinatorial objects known as Maya diagrams. The upshot of this analysis is a an explicit determinental representation for rational solutions in terms of classical orthogonal polynomials. In this paper we illustrate this approach by describing Hermite-type rational solutions of Painleve of the Noumi-Yamada system in terms of cyclic Maya diagrams. By way of example we explicitly construct Hermite-type solutions for the PIV, PV equations and the $A_4$ Painleve system.
painlev系统的理性解。
虽然Painleve方程的解是超越的,即它们不能用已知的初等函数来表示,但对于方程参数的特定值确实存在理性解。在研究Painleve方程的有理解中,一个非常成功的方法是将这些标量方程重新表述为一个对称的耦合系统,即称为修饰链的类里卡蒂方程。众所周知,周期修饰链相当于由Noumi和Yamada首先描述的$A_N$-Painleve系统。反过来,Noumi-Yamada系统可以线性化为使用双线性方程和$\tau$-函数;相应的有理解可以作为KP层次的有理解的专门化给出。painlevel方程和系统的有理解的分类现在可以简化为对被称为玛雅图的组合对象的分析。这种分析的结果是一个显式的行列式的有理解的形式,在经典的正交多项式。本文通过用循环玛雅图描述Noumi-Yamada系统painlevel的hermite型有理解来说明这种方法。通过实例,我们明确地构造了PIV、PV方程和$A_4$ Painleve系统的hermite型解。
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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