Harini Desiraju, Tomas Lasic Latimer, Pieter Roffelsen
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引用次数: 0
Abstract
Building upon the recent works of Bertola; Fasondini, Olver and Xu, we define a class of orthogonal polynomials on elliptic curves and establish a corresponding Riemann–Hilbert framework. We then focus on the special case, defined by a constant weight function, and use the Riemann–Hilbert problem to derive recurrence relations and differential equations for the orthogonal polynomials. We further show that the sub-class of even polynomials is associated to the elliptic form of Painlevé VI, with the tau function given by the Hankel determinant of even moments, up to a scaling factor. The first iteration of these even polynomials relates to the special case of Painlevé VI studied by Hitchin in relation to self-dual Einstein metrics.
在 Bertola、Fasondini、Olver 和 Xu 的最新研究成果基础上,我们定义了一类椭圆曲线上的正交多项式,并建立了相应的黎曼-希尔伯特框架。然后,我们将重点放在由常数权函数定义的特殊情况上,并利用黎曼-希尔伯特问题推导出正交多项式的递推关系和微分方程。我们进一步证明,偶次多项式子类与 Painlevé VI 的椭圆形式相关联,其 tau 函数由偶次矩的 Hankel 行列式给出,但不超过一个缩放因子。这些偶次多项式的第一次迭代与希钦研究的与自偶爱因斯坦度量相关的 Painlevé VI 特例有关。
期刊介绍:
Constructive Approximation is an international mathematics journal dedicated to Approximations and Expansions and related research in computation, function theory, functional analysis, interpolation spaces and interpolation of operators, numerical analysis, space of functions, special functions, and applications.
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