Bibliography T
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N. M. Temme (1994)
A set of algorithms for the incomplete gamma functions,
Probab. Engrg. Inform. Sci. 8, pp. 291–307.
Note: Includes Pascal program
Cited by: §GA.24(ii)
-
N. M. Temme (1996)
Special Functions: An Introduction to the Classical Functions of
Mathematical Physics,
John Wiley & Sons Inc. [ISBN 0-471-11313-1].
Links: MathReviews (J. M. H. Peters)
Cited by: §GA.11(iii), §GA.11, §GA.12, §GA.19(i), §GA.2(i), §GA.2(ii), §GA.2, §GA.5(i), §GA.5(iii), §GA.5, §GA.7(ii), §GA.7, §GA.9(i), §GA.9(ii), §GA.9, Ch.GA
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A. Terras (1999)
Fourier Analysis on Finite Groups and Applications,
London Mathematical Society Student Texts, Vol. 43, Cambridge University Press [ISBN 0-521-45718-1].
Links: MathReviews (Stefan Kühnlein)
Cited by: §GA.16
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W. J. Thompson (1997a)
Atlas for Computing Mathematical Functions: An Illustrated
Guide for Practitioners,
John Wiley & Sons Inc. [ISBN 0-471-18171-4].
Note: With CD-ROM including programs in Fortran 90 and Mathematica,
maximum accuracy 12D.
Links: MathReviews
Cited by: §GA.24(ii), §GA.24(iii), §GA.24(v)
-
W. J. Thompson (1997b)
Atlas for Computing Mathematical Functions: An Illustrated
Guide for Practitioners,
John Wiley & Sons Inc. [ISBN 0-471-00260-7].
Note: With CD-ROM including programs in C and Mathematica, maximum
accuracy 12D.
Cited by: §GA.24(ii), §GA.24(iii), §GA.24(v)
-
E. C. Titchmarsh (1948)
Theory of Fourier Integrals,
Oxford University Press.
Cited by: §GA.13
