Sklyanin-like algebras for (q-)linear grids and (q-)para-Krawtchouk polynomials

G. Bergeron, J. Gaboriaud, L. Vinet, A. Zhedanov
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引用次数: 6

Abstract

S-Heun operators on linear and $q$-linear grids are introduced. These operators are special cases of Heun operators and are related to Sklyanin-like algebras. The Continuous Hahn and Big $q$-Jacobi polynomials are functions on which these S-Heun operators have natural actions. We show that the S-Heun operators encompass both the bispectral operators and Kalnins and Miller's structure operators. These four structure operators realize special limit cases of the trigonometric degeneration of the original Sklyanin algebra. Finite-dimensional representations of these algebras are obtained from a truncation condition. The corresponding representation bases are finite families of polynomials: the para-Krawtchouk and $q$-para-Krawtchouk ones. A natural algebraic interpretation of these polynomials that had been missing is thus obtained. We also recover the Heun operators attached to the corresponding bispectral problems as quadratic combinations of the S-Heun operators
(q-)线性网格和(q-)拟克劳楚克多项式的类sklyanin代数
介绍了线性网格和$q$-线性网格上的S-Heun算子。这些算子是Heun算子的特殊情况,与类sklyanin代数有关。连续Hahn和Big $q$-Jacobi多项式是这些S-Heun算子具有自然作用的函数。我们证明S-Heun算子包含双谱算子和Kalnins和Miller结构算子。这四种结构算子实现了原始Sklyanin代数三角退化的特殊极限情况。这些代数的有限维表示是由截断条件得到的。对应的表示基是多项式的有限族:para-Krawtchouk族和$q$-para-Krawtchouk族。一个自然的代数解释这些多项式,已被遗漏,从而获得。我们还恢复了相应双谱问题的Heun算子作为S-Heun算子的二次组合
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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