Implementation of a lattice method for numerical multiple integration

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Implementation of a lattice method for numerical multiple integration

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ACM Transactions on Mathematical Software (TOMS) archive
Volume 19 , Issue 4 (December 1993) table of contents

Pages: 523 - 545

Year of Publication: 1993

ISSN:0098-3500

Authors

Stephen Joe	Univ. of Waikato, Hamilton, New Zealand
Ian H. Sloan	Univ. of New South Wales, Sydney, Australia

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 4, Downloads (12 Months): 72, Citation Count: 3

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ABSTRACT

An implementation of a method for numerical multiple integration based on a sequence of imbedded lattice rules is given. Besides yielding an approximation to the integral, this implementation also provides an error estimate which does not require much extra computation. The results of some numerical experiments conclude the paper.

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.

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	2	CRANLEY, R., AND PATTERSON, T. N.L. 1976. Randomization of number theorehc methods for multiple integration. SIAM J. Numer. Anal. 13, 904- 914.
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	6	Shaun Disney , Ian H. Sloan, Lattice integration rules of maximal rank formed by copying rank 1 rules, SIAM Journal on Numerical Analysis, v.29 n.2, p.566-577, April 1992 [doi>10.1137/0729036]
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	9	GENZ, A. C., AND MALIK, A.A. 1980. An adaptive algorithm for numerical integration over an N-dimensional rectangular region. J. Cornput. Appl Math. 6, 295-302.
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	12	S. Joe, Randomization of lattice rules for numerical multiple integration, Journal of Computational and Applied Mathematics, v.31 n.2, p.299-304, Aug. 1990 [doi>10.1016/0377-0427(90)90172-V]
	13	JOE, S. 1990b. A curiosity arising from searches for good lattice points. Applied Math. Preprint AM90/8, Univ. of New South Wales, Sydney.
	14	Stephen Joe , Ian H. Sloan, Imbedded lattice rules for multidimensional integration, SIAM Journal on Numerical Analysis, v.29 n.4, p.1119-1135, Aug. 1992 [doi>10.1137/0729068]
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	17	NIEDERREITER, H. 1978. Quasi-Monte Carlo methods and pseudo-random numbers. Bull. Am. Math. Soc. 84, 957-1041.
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CITED BY 3

	W. J. Whiten , L. Kocis, Regarding test functions for multi-dimensional integration, ACM SIGNUM Newsletter, v.30 n.1, p.2-7, Jan. 1995
	Tiancheng Li , Ian Robinson , Michael Hill, The index of merit of kth-copy integration lattices, Journal of Computational and Applied Mathematics, v.205 n.1, p.394-405, August, 2007
	Brian Luft , Vadim Shapiro , Igor Tsukanov, Geometrically adaptive numerical integration, Proceedings of the 2008 ACM symposium on Solid and physical modeling, June 02-04, 2008, Stony Brook, New York

INDEX TERMS

Primary Classification:
G. Mathematics of Computing
G.1 NUMERICAL ANALYSIS
G.1.4 Quadrature and Numerical Differentiation
Subjects: Multidimensional (multiple) quadrature

General Terms:
Algorithms, Performance

Keywords:
lattice rules

REVIEW

"Alan Charles Genz : Reviewer"

Major advances have recently been made in the theory of lattice rules for numerical multiple integration. These rules have become increasingly attractive for practical work because, like Monte Carlo rules, they consist of simple, equally weigh more...

Collaborative Colleagues:

Stephen Joe: colleagues

Ian H. Sloan: colleagues

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