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Identifying minimal and dominant solutions for Kummer recursions

Author(s): Alfredo Deaño; Javier Segura; Nico M. Temme.
Journal: Math. Comp. 77 (2008), 2277-2293.
MSC (2000): Primary 33C15, 39A11, 41A60, 65D20
Posted: May 14, 2008
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Abstract: We identify minimal and dominant solutions of three-term recurrence relations for the confluent hypergeometric functions $ _1F_1(a+\epsilon_1 n;c+\epsilon_2 n;z)$ and $ U(a+\epsilon_1 n,c+\epsilon_2 n,z)$, where $ \epsilon_i=0,\pm 1$ (not both equal to 0). The results are obtained by applying Perron's theorem, together with uniform asymptotic estimates derived by T. M. Dunster for Whittaker functions with large parameter values. The approximations are valid for complex values of $ a$, $ c$ and $ z$, with $ \vert\arg\,z\vert<\pi$.

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Additional Information:

Alfredo Deaño
Affiliation: DAMTP, Centre for Mathematical Sciences, University of Cambridge, Wilberforce Road, CB3 0WA, United Kingdom
Email: ad495@cam.ac.uk

Javier Segura
Affiliation: Departamento de Matemáticas, Estadística y Computación, Universidad de Cantabria, 39005 Santander, Spain
Email: javier.segura@unican.es

Nico M. Temme
Affiliation: CWI, P.O. Box 94079, 1090 GB Amsterdam, The Netherlands
Email: nicot@cwi.nl

DOI: 10.1090/S0025-5718-08-02122-4
PII: S 0025-5718(08)02122-4
Keywords: Kummer functions, Whittaker functions, confluent hypergeometric functions, recurrence relations, difference equations, stability of recurrence relations, numerical evaluation of special functions, asymptotic analysis
Received by editor(s): August 30, 2007
Posted: May 14, 2008
Copyright of article: Copyright 2008, American Mathematical Society
The copyright for this article reverts to public domain after 28 years from publication.

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