Regular ArticleComputing the Principal Branch of log-Gamma☆,☆☆
References (14)
- et al.
Handbook of Mathematical Functions
(1965) - et al.
The Maple V Language Reference Manual
(1991) Functions of One Complex Variable
(1973)Riemann's Zeta Function
(1974)Higher Transcendental Functions
(1953)Branch cuts for complex functions
The State of the Art in Numerical Analysis
(1987)
There are more references available in the full text version of this article.
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This research was supported in part by the Natural Sciences and Engineering Research Council of Canada and by the Information Technology Research Centre of Ontario, and was carried out, in part, while the author was a visitor at the University of New South Wales, Sydney, Australia.
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A. IserlesM. J. D. Powell, Eds.
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