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About families of orthogonal polynomials satisfying Heun’s differential equation

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Magnus, Alphonse [UCL] Ndayiragije, François [University of Burundi] Ronveaux, André [University of Namur]

We consider special families of orthogonal polynomials satisfying differential equations. Besides known hypergeometric cases, we look especially for Heun's differential equations. We show that such equations are satisfied by orthogonal polynomials related to some classical weight functions modified by Dirac weights or by division of powers of binomials. An appropriate set of biorthogonal rational functions, or 2-point Padé approximations, is also described.

Document type Article de périodique (Journal article) – Article de recherche
Access type Accès libre
Publication date 2021
Language Anglais
Journal information "Journal of Approximation Theory" - Vol. 263, p. 105522 (2021)
Peer reviewed yes
Publisher Elsevier BV
issn 0021-9045
Publication status Publié
Affiliation UCL - SST/IRMP - Institut de recherche en mathématique et physique
Keywords Applied Mathematics ; General Mathematics ; Numerical Analysis ; Analysis
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Bibliographic reference Magnus, Alphonse ; Ndayiragije, François ; Ronveaux, André. About families of orthogonal polynomials satisfying Heun’s differential equation. In: Journal of Approximation Theory, Vol. 263, p. 105522 (2021)
Permanent URL http://hdl.handle.net/2078.1/254960