The patchwork rejection technique for sampling from unimodal distributions

Subscribe (Full Service)


	Search: The ACM Digital Library The Guide

	Feedback

The patchwork rejection technique for sampling from unimodal distributions

Full text

Pdf (187 KB)

Source

ACM Transactions on Modeling and Computer Simulation (TOMACS) archive
Volume 9 , Issue 1 (January 1999) table of contents

Pages: 59 - 80

Year of Publication: 1999

ISSN:1049-3301

Authors

Ernst Stadlober	Technical Univ. Graz, Graz, Austria
Heinz Zechner	Technical Univ. Graz, Graz, Austria

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 2, Downloads (12 Months): 27, Citation Count: 3

Additional Information:

abstract references cited by index terms review collaborative colleagues peer to peer

Tools and Actions:	Request Permissions Review this Article Save this Article to a Binder Display Formats: BibTeX EndNote ACM Ref

DOI Bookmark:	Use this link to bookmark this Article: http://doi.acm.org/10.1145/301677.301685 What is a DOI?

ABSTRACT

We report on both theoretical developments and comutational experience with the patchwork rejection technique in Zechner and Stadlober [1993] and Zechner [1997]. The basic approach is due to Minh [1988], who suggested a special sampling method for the gamma distribution. The method's general objective is to rearrange the area below the density of histogram f (x) in the body of the distribution by certain point reflections such that variates may be generated efficiently within a large center interval. This is carried out via uniform hat functions, combined with minorizing rectangles for immediate acceptance of one transformed uniform deviate. The remaining tails of f(x) are covered by exponential functions. Experiments show that patchwork rejection algorithms are in general faster than their competitors at the cost of higher set-up times.

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	J. H. Ahrens , U. Dieter, Generating gamma variates by a modified rejection technique, Communications of the ACM, v.25 n.1, p.47-54, Jan. 1982 [doi>10.1145/358315.358390]
	2	J. H. Ahrens , U. Dieter, Computer Generation of Poisson Deviates from Modified Normal Distributions, ACM Transactions on Mathematical Software (TOMS), v.8 n.2, p.163-179, June 1982 [doi>10.1145/355993.355997]
	3	L. Devroye, A simple generator for discrete log-concave distributions, Computing, v.39 n.1, p.87-91, 1987 [doi>10.1007/BF02307716]
	4	H RMANN, W. 1992. The transformed rejection method for generating Poisson random variables. Insurance: Math. Econ. 11, 1-7.
	5	H RMANN, W. 1993. The generation of binomial variates. J. Stat. Comput. Simul. 46, 1/2, 101-110.
	6	H RMANN, W. 1994. A universal generator for discrete log-concave distributions. Computing 52, 1, 89-96.
	7	Wolfgang Hörmann, A rejection technique for sampling from T-concave distributions, ACM Transactions on Mathematical Software (TOMS), v.21 n.2, p.182-193, June 1995 [doi>10.1145/203082.203089]
	8	W. Hörmann , G. Derflinger, Rejection-inversion to generate variates from monotone discrete distributions, ACM Transactions on Modeling and Computer Simulation (TOMACS), v.6 n.3, p.169-184, July 1996 [doi>10.1145/235025.235029]
	9	H RMANN, W. AND DERFLINGER, G. 1997. An automatic generator for a large class of unimodal discrete distributions. In ESM97, Gaining Competitive Advantage Through Simulation Technologies, A. R. Kaylan and A. Lehmann, Eds. 139-144.
	10	KACHITVICHYANUKUL, V. AND SCHMEISER, B.W. 1985. Computer generation of hypergeometric random variates. J. Stat. Comput. Simul. 22, 1, 127-145.
	11	Voratas Kachitvichyanukul , Bruce W. Schmeiser, Binomial random variate generation, Communications of the ACM, v.31 n.2, p.216-222, Feb. 1988 [doi>10.1145/42372.42381]
	12	A. W. Kemp, Patchwork rejection algorithms, Journal of Computational and Applied Mathematics, v.31 n.1, p.127-131, July 1990 [doi>10.1016/0377-0427(90)90343-X]
	13	Do Le Minh, Generating gamma variates, ACM Transactions on Mathematical Software (TOMS), v.14 n.3, p.261-266, Sept. 1988 [doi>10.1145/44128.214382]
	14	SAKASEGAWA, H. 1983. Stratified rejection and squeeze method for generating beta random numbers. Annual Institute Statistical Math. 35, B, 291-302.
	15	SCHMEISER, B. W. AND BABU, A. J. G. 1980. Beta variate generation via exponential majorizing functions. Oper. Res. 28, 4, 917-926. (Errata: Oper. Research 31, 1983, 802).
	16	SCHMEISER, B. W. AND LAL, R. 1980. Squeeze methods for generating gamma variates. J. Am. Stat. Assoc. 75, 371, 675-682.
	17	STADLOBER, E. 1989. Sampling from Poisson, binomial, and hypergeometric distributions: ratio of uniforms as a simple and fast alternative. Math. Statist. Sektion 303. Forschungsgesellschaft Joanneum, Graz, Austria.
	18	E. Stadlober, The ratio of uniforms approach for generating discrete random variates, Journal of Computational and Applied Mathematics, v.31 n.1, p.181-189, July 1990 [doi>10.1016/0377-0427(90)90349-5]
	19	STADLOBER, E. AND PIOK, M. 1995. WinRand 1.0/95.: Accessible by anonymous ftp from statistik.tu-graz, ac. at \ winrand.
	20	ZECHNER, H. AND STADLOBER, E. 1993. Generating beta variates via patchwork rejection. Computing 50, 1, 1-18.
	21	ZECHNER, H. 1997. Efficient sampling from continuous and discrete unimodal distributions. Ph.D. Dissertation. Technical University Graz, Graz, Austria.

CITED BY 3

	Jens Gustedt, Efficient sampling of random permutations, Journal of Discrete Algorithms, v.6 n.1, p.125-139, March, 2008
	Zhenhai Yang , W. K. Pang , S. H. Hou , P. K. Leung, On a combination method of VDR and patchwork for generating uniform random points on a unit sphere, Journal of Multivariate Analysis, v.95 n.1, p.23-36, July 2005
	James D. Brown , Gerard B. M. Heuvelink, The Data Uncertainty Engine (DUE): A software tool for assessing and simulating uncertain environmental variables, Computers & Geosciences, v.33 n.2, p.172-190, February, 2007

INDEX TERMS

Primary Classification:
I. Computing Methodologies
I.6 SIMULATION AND MODELING

Additional Classification:
G. Mathematics of Computing
G.3 PROBABILITY AND STATISTICS
Subjects: Random number generation; Statistical software

General Terms:
Algorithms, Performance, Reliability

Keywords:
patchwork rejection, random variate generation, random variate transformations, sampling techniques, stochastic simulation, unimodal distributions

REVIEW

"R. Sambasiva Rao : Reviewer"

The rejection regions for many continuous and discrete statistical distributions are available in the literature. This paper is an outcome of the authors' continuous research work [1–4] in sampling methods. Minh [5] proposed more...

Collaborative Colleagues:

Ernst Stadlober: colleagues

Heinz Zechner: colleagues

Peer to Peer - Readers of this Article have also read:

Data structures for quadtree approximation and compression Communications of the ACM 28, 9
Hanan Samet
A hierarchical single-key-lock access control using the Chinese remainder theorem Proceedings of the 1992 ACM/SIGAPP Symposium on Applied computing
Kim S. Lee , Huizhu Lu , D. D. Fisher
The GemStone object database management system Communications of the ACM 34, 10
Paul Butterworth , Allen Otis , Jacob Stein
Putting innovation to work: adoption strategies for multimedia communication systems Communications of the ACM 34, 12
Ellen Francik , Susan Ehrlich Rudman , Donna Cooper , Stephen Levine
An intelligent component database for behavioral synthesis Proceedings of the 27th ACM/IEEE Design Automation Conference on
Gwo-Dong Chen , Daniel D. Gajski

Adobe Acrobat

QuickTime

Windows Media Player

Real Player