The use of Taylor series to test accuracy of function programs

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The use of Taylor series to test accuracy of function programs

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ACM Transactions on Mathematical Software (TOMS) archive
Volume 17 , Issue 1 (March 1991) table of contents

Pages: 55 - 63

Year of Publication: 1991

ISSN:0098-3500

Authors

W. J. Cody	Argonne National Labs, Argonne, IL
L. Stoltz	Argonne National Labs, Argonne, IL

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 4, Downloads (12 Months): 54, Citation Count: 3

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abstract references cited by index terms review collaborative colleagues

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ABSTRACT

This paper discusses the use of local Taylor series expansions for determining the accuracy of computer programs for special functions. The main example is testing of programs for exponential integrals. Additional applicaitons include testing of programs for certain Bessel functions, Dawson's integral, and error functions.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

	1	Milton Abramowitz, Handbook of Mathematical Functions, With Formulas, Graphs, and Mathematical Tables,, Dover Publications, Incorporated, 1974
	2	CODY, W.J. SPECFUN--A portable special function package. In New Computing Environments: M~crocomputers in Large-Scale Scientific Computing. A. Wouk, ed., SIAM, Philadelphia, 1987, 1-12.
	3	W. J. Cody, Algorithm 665: Machar: a subroutine to dynamically determined machine parameters, ACM Transactions on Mathematical Software (TOMS), v.14 n.4, p.303-311, Dec. 1988 [doi>10.1145/50063.51907]
	4	ConY, W. J. Performance evaluation of programs related to the real gamma function. Preprint MCS-P12-0988, Mathematics and Computer Science Division, Argonne National Laboratory, Argonne, Illinois, 1988.
	5	CODY, W.J. Performance evaluation of programs for the error and complementary error functions. Preprint MCS-P13-0988, Mathematics and Computer Science Division, Argonne National Laboratory, Argonne, Illinois, 1988.
	6	W. J. Cody , L. Stoltz, Performance evaluation of programs for certain Bessel functions, ACM Transactions on Mathematical Software (TOMS), v.15 n.1, p.41-48, March 1989 [doi>10.1145/62038.62039]
	7	COPY, W. J., AND THACHER, H. C., JR. Chebyshev approximations for the exponential integral Ei( x). Math. Comput. 23 (1969), 289-303.
	8	Jack J Dongarra , Eric Grosse, Distribution of mathematical software via electronic mail, Communications of the ACM, v.30 n.5, p.403-407, May 1987 [doi>10.1145/22899.22904]
	9	Walter Gautschi , Bruce J. Klein, Recursive computation of certain derivatives&a study of error propagation, Communications of the ACM, v.13 n.1, p.7-9, Jan. 1970 [doi>10.1145/361953.361959]
	10	Walter Gautschi , Bruce J. Klein, Remark on algorithm 282 [S22] derivatives of ex/x, cos(x)/x, and sin (x)/x, Communications of the ACM, v.13 n.1, p.53-54, Jan. 1970 [doi>10.1145/361953.361988]
	11	NAg FORTRAN Library Manual, Mark 11, Volume 6. Numerical Algorithms Group, Ltd., Oxford, 1984.
	12	SFUN/LIBRARY User's Manual. IMSL, Inc., Houston, Tex., 1987.

CITED BY 3

	W. J. Cody, Algorithm 715; SPECFUN—a portable FORTRAN package of special function routines and test drivers, ACM Transactions on Mathematical Software (TOMS), v.19 n.1, p.22-30, March 1993
	Allan J. MacLeod, Algorithm 757: MISCFUN, a software package to compute uncommon special functions, ACM Transactions on Mathematical Software (TOMS), v.22 n.3, p.288-301, Sept. 1996
	Amparo Gil , Javier Segura , Nico M. Temme, Algorithm 822: GIZ, HIZ: two Fortran 77 routines for the computation of complex Scorer functions, ACM Transactions on Mathematical Software (TOMS), v.28 n.4, p.436-447, December 2002

INDEX TERMS

Primary Classification:
G. Mathematics of Computing
G.4 MATHEMATICAL SOFTWARE
Subjects: Certification and testing

Additional Classification:
G. Mathematics of Computing
G.1 NUMERICAL ANALYSIS
G.1.0 General
Subjects: Numerical algorithms

General Terms:
Algorithms, Measurement, Performance, Verification

Keywords:
Bessel functions, Dawson's integral, Exponential integrals, performance evaluation

REVIEW

"Ian Gladwell : Reviewer"

Local Taylor series expansions are recommended for determining the accuracy of special function routines. The authors emphasize using exact machine numbers as arguments in the Taylor series, special action to deal with large relative errors ne more...

Collaborative Colleagues:

W. J. Cody: colleagues

L. Stoltz: colleagues

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