Journal article
Pollaczek polynomials and Padé approximants: some closed-form expressions
Journal of computational and applied mathematics, v 32(1), pp 301-310
1990
Abstract
Recently, some work has been devoted to the task of obtaining closed-form expressions for important classes of orthogonal polynomials. This has been done successfully for the associated Jacobi polynomials and their special cases, including the associated Laguerre and Hermite polynomials. Such expressions allow one to write closed-form expressions for the [
n − 1/
n] Padé approximants to important transcendental functions, for instance, expressions for the associated Jacobi polynomials provide in closed form the truncates of Gauss' continued fraction.
In this paper, we continue this work by developing closed-form expressions for the Pollaczek polynomials
P
n
λ
(
x;
a,
b,
c). These expressions involve a finite number of terms, each algebraic in character. This is to be contr with the traditional representation, which is a ratio of cross products of Gaussian hypergeometric functions, an expression not algebraic in the variable and not identifiably a polynomial. We examine some special cases of this formula, including the associated ultraspherical polynomials and the Chihara-Ismail polynomials. Finally, we determine the [
n − 1/
n] Padé approximants to a certain ratio of Gaussian hypergeometric functions.
Metrics
Details
- Title
- Pollaczek polynomials and Padé approximants: some closed-form expressions
- Creators
- Jet Wimp - Drexel University
- Publication Details
- Journal of computational and applied mathematics, v 32(1), pp 301-310
- Publisher
- Elsevier
- Resource Type
- Journal article
- Language
- English
- Academic Unit
- Mathematics
- Web of Science ID
- WOS:A1990EL97000031
- Scopus ID
- 2-s2.0-38249016405
- Other Identifier
- 991019312365404721
InCites Highlights
Data related to this publication, from InCites Benchmarking & Analytics tool:
- Web of Science research areas
- Mathematics, Applied