New analytic representations of the hypergeometric functions p+1Fp
Fecha
2021Versión
Acceso abierto / Sarbide irekia
Tipo
Artículo / Artikulua
Versión
Versión aceptada / Onetsi den bertsioa
Impacto
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10.1007/s00365-021-09537-2
Resumen
The power series expansions of the hypergeometric functions p+1Fp (a,b1,…,bp;c1,…,cp;z) converge either inside the unit disk |z|<1 or outside this disk |z|>1. Nørlund’s expansion in powers of z/(z−1) converges in the half-plane R(z)<1/2. For arbitrary z0∈C, Bühring’s expansion in inverse powers of z−z0 converges outside the disk |z−z0|= max{|z0|,|z0−1|}. None of them converge on the whole indente ...
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The power series expansions of the hypergeometric functions p+1Fp (a,b1,…,bp;c1,…,cp;z) converge either inside the unit disk |z|<1 or outside this disk |z|>1. Nørlund’s expansion in powers of z/(z−1) converges in the half-plane R(z)<1/2. For arbitrary z0∈C, Bühring’s expansion in inverse powers of z−z0 converges outside the disk |z−z0|= max{|z0|,|z0−1|}. None of them converge on the whole indented closed unit disk |z|≤1,z≠1. In this paper, we derive new expansions in terms of rational functions of z that converge in different regions, bounded or unbounded, of the complex plane that contain the indented closed unit disk. We give either explicit formulas for the coefficients of the expansions or recurrence relations. The key point of the analysis is the use of multi-point Taylor expansions in appropriate integral representations of p+1Fp(a,b1,…,bp;c1,…,cp;z). We show the accuracy of the approximations by means of several numerical experiments. [--]
Materias
Generalized hypergeometric functions,
Approximation by rational functions,
Two and three-point Taylor expansions
Editor
Springer
Publicado en
Constructive Approximation (2021)
Departamento
Universidad Pública de Navarra. Departamento de Estadística, Informática y Matemáticas /
Nafarroako Unibertsitate Publikoa. Estatistika, Informatika eta Matematika Saila /
Universidad Pública de Navarra/Nafarroako Unibertsitate Publikoa. Institute for Advanced Materials and Mathematics - INAMAT2