Efficient algorithms for construction of recurrence relations for the expansion and connection coefficients in series of quantum classical orthogonal polynomials

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Date

2010

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Journal ISSN

Volume Title

Type

Article

Publisher

ELSEVIER SCIENCE BV

Series Info

JOURNAL OF ADVANCED RESEARCH;Volume: 1 Issue: 3 Pages: 193-207

Abstract

Formulae expressing explicitly the q-difference derivatives and the moments of the polynomials P-n(x; q) is an element of Z (T={P-n(x; q) is an element of Askey-Wilson polynomials: Al-Salam-Carlitz I, Discrete q-Hermite I, Little (Big) q-Laguerre, Little (Big) q-Jacobi, q-Hahn, Alternative q-Charlier) of any degree and for any order in terms of Pi(x; q) themselves are proved. We will also provide two other interesting formulae to expand the coefficients of general-order q-difference derivatives D-q(P) f(x), and for the moments x(l) D-q(p) f(x), of an arbitrary function f(x) in terms of its original expansion coefficients. We used the underlying formulae to relate the coefficients of two different polynomial systems of basic hypergeometric orthogonal polynomials, belonging to the Askey-Wilson polynomials and Pn(x; q). T. These formulae are useful in setting up the algebraic systems in the unknown coefficients, when applying the spectral methods for solving q-difference equations of any order. (C) 2010 Cairo University. All rights reserved.

Description

Accession Number: WOS:000215316400004

Keywords

University of q-classical orthogonal polynomials; Askey-Wilson polynomials; q-difference equations; Fourier coefficients; Recurrence relations; Connection problem

Citation

Cited References in Web of Science Core Collection: 56