超几何权重正交多项式递推系数的微分与差分方程及第六届painlevleve方程的Bäcklund变换

Pub Date : 2020-09-24 DOI:10.1142/s2010326321500295
Jie Hu, G. Filipuk, Yang Chen
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引用次数: 3

摘要

从[G.](1)具有超几何权值的离散正交多项式,对称积分。几何学。方法[j] .中文信息学报,2014,36 (1):1 - 2 .][公式:见文本]的第六种painlev方程的形式(权重的一个参数是微分方程中的自变量)[G]的解也有联系。(1)具有超几何权值的离散正交多项式,对称积分。几何学。[j].中国科学:自然科学版,2018,第1期,第6页。在本文中,我们从系统中导出了一个二阶非线性差分方程,并给出了该差分方程如何由第六阶painlevleve方程的Bäcklund变换产生的显式公式。我们还提出了另一种方法来推导递推系数与第六阶painlevevlev方程解之间的联系。
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Differential and difference equations for recurrence coefficients of orthogonal polynomials with hypergeometric weights and Bäcklund transformations of the sixth Painlevé equation
It is known from [G. Filipuk and W. Van Assche, Discrete orthogonal polynomials with hypergeometric weights and Painlevé VI, Symmetry Integr. Geom. Methods Appl. 14 (2018), Article ID: 088, 19 pp.] that the recurrence coefficients of discrete orthogonal polynomials on the nonnegative integers with hypergeometric weights satisfy a system of nonlinear difference equations. There is also a connection to the solutions of the [Formula: see text]-form of the sixth Painlevé equation (one of the parameters of the weights being the independent variable in the differential equation) [G. Filipuk and W. Van Assche, Discrete orthogonal polynomials with hypergeometric weights and Painlevé VI, Symmetry Integr. Geom. Methods Appl. 14 (2018), Article ID: 088, 19 pp.]. In this paper, we derive a second-order nonlinear difference equation from the system and present explicit formulas showing how this difference equation arises from the Bäcklund transformations of the sixth Painlevé equation. We also present an alternative way to derive the connection between the recurrence coefficients and the solutions of the sixth Painlevé equation.
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