Error estimation in automatic quadrature routines

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Error estimation in automatic quadrature routines

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ACM Transactions on Mathematical Software (TOMS) archive
Volume 17 , Issue 2 (June 1991) table of contents

Pages: 233 - 252

Year of Publication: 1991

ISSN:0098-3500

Authors

Jarle Berntsen	Univ. of Bergen, Bergen, Norway
Terje O. Espelid	Univ. of Bergen, Bergen, Norway

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 2, Downloads (12 Months): 42, Citation Count: 11

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abstract references cited by index terms review collaborative colleagues

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ABSTRACT

A new algorithm for estimating the error in quadrature approximations is presented. Based on the same integrand evaluations that we need for approximating the integral, one may, for many quadrature rules, compute a sequence of null rule approximations. These null rule approximations are then used to produce an estimate of the local error. The algorithm allows us to take advantage of the degree of precision of the basic quadrature rule. In the experiments we show that the algorithm works satisfactorily for a selection of different quadrature rules on all test families of integrals.

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	BER~rTSEN, J. A test of some well known quadrature routines. Reports in Informatics 20, Dept. of Informatics, Univ. of Bergen, 1986.
	2	J. Berntsen, Practical error estimation in adaptive multidimensional quadrature routines, Journal of Computational and Applied Mathematics, v.25 n.3, p.327-340, May 1989 [doi>10.1016/0377-0427(89)90036-8]
	3	BERNTSEN, J., ESPELU), T. O., AND GENZ, A. A test of ADMINT. Reports in Informatics 31, Dept. of Informatics, Univ. of Bergen, 1988.
	4	Jarle Berntsen , Terje O. Espelid , Alan Genz, An adaptive algorithm for the approximate calculation of multiple integrals, ACM Transactions on Mathematical Software (TOMS), v.17 n.4, p.437-451, Dec. 1991 [doi>10.1145/210232.210233]
	5	DAVIS, P. J., AND RABINOWITZ, P. Methods of Numerica! Integration. Academic Press, 1984.
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	7	ESPELID, T.O. Integration rules, null rules and error estimation. Reports in Informatics 33, Dept. of Informatics, Univ. of Bergen, 1988.
	8	T. O. Espelid , T. Sørevik, A discussion of a new error estimate for adaptive quadrature, BIT, v.29 n.2, p.283-294, 1989 [doi>10.1007/BF01952683]
	9	GENZ, A C., AND MALIK, A.A. An adaptive algorithm for numerical integration over an N-dimenmonal rectangular region. J. Comput. Appl. Math. 6 (1980), 295-302.
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	11	LAURIE, D.P. Sharper error estimate in adaptive quadrature. BIT 23 (1983), 258-261
	12	LAURIE, D. P. Practical error estimation in numerical integration. J. Comput. Appl. Math. 12 & 13 (1985), 425 431.
	13	LYNESS, J.N. Symmetric integration rules for hypercubes III Construction of integration rules using null rules. Math. Comput. 19 (1965), 625-637.
	14	J. N. Lyness , J. J. Kaganove, Comments on the Nature of Automatic Quadrature Routines, ACM Transactions on Mathematical Software (TOMS), v.2 n.1, p.65-81, March 1976 [doi>10.1145/355666.355671]
	15	LYNESS, J. N., AND KAGANOVE, J. J. A technique for comparing automatic quadrature routines. Comput J. 20 (1977), 170-177.
	16	Wm. M. McKeeman, Certification of algorithm 145: adaptive numerical integration by Simpson's rule, Communications of the ACM, v.6 n.4, p.167-168, April 1963 [doi>10.1145/366349.366535]
	17	PIESSENS, R., DE DONCKER KAPENGA, E., UBERHUBER, C W , AND KAHANER, D K QUAD- PACK, a subroutine package for automatic integration. Series in Corrlplttational Ma{h. 1. Springer-Verlag, 1983.
	18	SOREVIK, T. Reliable and efficient algorithms for adaptive quadrature Tech. Rep. Thesis for the degree Doctor Scientiarum, Dept. of Informatics, Univ. of Bergen, 1988.
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CITED BY 11

	Paola Favati , Giuseppe Fiorentino , Grazia Lotti , Francesco Romani, Local error estimates and regularity tests for the implementation of double adaptive quadrature, ACM Transactions on Mathematical Software (TOMS), v.23 n.1, p.16-31, March 1997
	Stephen Joe , Ian H. Sloan, Implementation of a lattice method for numerical multiple integration, ACM Transactions on Mathematical Software (TOMS), v.19 n.4, p.523-545, Dec. 1993
	Jarle Berntsen , Terje O. Espelid, Algorithm 706; DCUTRI: an algorithm for adaptive cubature over a collection of triangles, ACM Transactions on Mathematical Software (TOMS), v.18 n.3, p.329-342, Sept. 1992
	Ronald Cools , Luc Pluym , Dirk Laurie, Algorithm 764: Cubpack++: a C++ package for automatic two-dimensional cubature, ACM Transactions on Mathematical Software (TOMS), v.23 n.1, p.1-15, March 1997
	Alan Genz , Ronald Cools, An adaptive numerical cubature algorithm for simplices, ACM Transactions on Mathematical Software (TOMS), v.29 n.3, p.297-308, September 2003
	Jarle Berntsen , Ronald Cools , Terje O. Espelid, Algorithm 720; an algorithm for adaptive cubature over a collection of 3-dimensional simplices, ACM Transactions on Mathematical Software (TOMS), v.19 n.3, p.320-332, Sept. 1993
	Bahar Biller , Barry L. Nelson, Modeling and generating multivariate time-series input processes using a vector autoregressive technique, ACM Transactions on Modeling and Computer Simulation (TOMACS), v.13 n.3, p.211-237, July 2003
	M. Ragulskis , L. Saunoriene, Generalisations of the compound trapezoidal rule, Applied Numerical Mathematics, v.58 n.1, p.40-58, January, 2008
	L. F. Shampine, Vectorized adaptive quadrature in MATLAB, Journal of Computational and Applied Mathematics, v.211 n.2, p.131-140, February, 2008
	Terje O. Espelid, Algorithm 868: Globally doubly adaptive quadrature—reliable Matlab codes, ACM Transactions on Mathematical Software (TOMS), v.33 n.3, p.21-es, August 2007
	B. Llanas , F. J. Sáinz, Fast training of neural trees by adaptive splitting based on cubature, Neurocomputing, v.71 n.16-18, p.3387-3408, October, 2008

INDEX TERMS

Primary Classification:
G. Mathematics of Computing
G.1 NUMERICAL ANALYSIS
G.1.4 Quadrature and Numerical Differentiation
Subjects: Adaptive and iterative quadrature

General Terms:
Algorithms, Experimentation

Keywords:
reliability

REVIEW

"Luigi Gatteschi : Reviewer"

The new local error estimation procedure presented in this interesting and well-written paper is intended to be used in adaptive quadrature routines for a one-dimensional integral over a finite interval. The procedure is based on the construc more...

Collaborative Colleagues:

Jarle Berntsen: colleagues

Terje O. Espelid: colleagues

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