Optimization via simulation

Subscribe (Full Service)


	Search: The ACM Digital Library The Guide

	Feedback

Optimization via simulation: randomized-direction stochastic approximation algorithms using deterministic sequences

Full text

Pdf (175 KB)

Source

Winter Simulation Conference archive
Proceedings of the 34th conference on Winter simulation: exploring new frontiers table of contents

San Diego, California

SESSION: Analysis methodology table of contents

Pages: 285 - 291

Year of Publication: 2002

ISBN:0-7803-7615-3

Authors

Xiaoping Xiong	University of Maryland, College Park, MD
I-Jeng Wang	Applied Physics Laboratory, Laurel, MD
Michael C. Fu	University of Maryland, College Park, MD

Sponsors

IEEE/CS : Institute of Electrical and Electronics Engineers/Computer Society
ASA : American Statistical Association
IEEE/SMCS : Institute of Electrical and Electronics Engineers/Systems, Man, and Cybernetics Society
INFORMS/CS : Institute for Operations Research and the Management Sciences/College on Simulation
NIST : National Institute of Standards and Technology
ACM: Association for Computing Machinery
(SCS) : The Society for Modeling and Simulation International
SIGSIM: ACM Special Interest Group on Simulation and Modeling
IIE : Institute of Industrial Engineers

Publisher

Winter Simulation Conference

Bibliometrics

Downloads (6 Weeks): 1, Downloads (12 Months): 4, Citation Count: 3

Additional Information:

abstract references cited by collaborative colleagues

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

ABSTRACT

We study the convergence and asymptotic normality of a generalized form of stochastic approximation algorithm with deterministic perturbation sequences. Both one-simulation and two-simulation methods are considered. Assuming a special structure of deterministic sequence, we establish sufficient condition on the noise sequence for a.s. convergence of the algorithm. Construction of such a special structure of deterministic sequence follows the discussion of asymptotic normality. Finally we discuss ideas on further research in analysis and design of the deterministic perturbation sequences.

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	Shalabh Bhatnagar , Michael C. Fu , Steven I. Marcus , I-Jeng Wang, Two-timescale simultaneous perturbation stochastic approximation using deterministic perturbation sequences, ACM Transactions on Modeling and Computer Simulation (TOMACS), v.13 n.2, p.180-209, April 2003 [doi>10.1145/858481.858486]
	2	Blum, J. R. 1954. Multidimensional stochastic approximation methods. Ann. Math. Stats. 25: 737--744.
	3	Fabian, V. 1968. On asymptotic normality in stochastic approximation. The Annals of Mathematical Statistics 39(4): 1327--1332.
	4	Hedayat, A. S., N. J. A. Sloane, and J. Stufken. 1999. Orthogonal Arrays: Theory and Applications, Springer Verlag, New York, NY.
	5	Kushner, H. J. and D. S. Clark. 1978 Stochastic Approximation Methods for Constrained and Unconstrained Systems, Springer Verlag, New York.
	6	Harald Niederreiter, Random number generation and quasi-Monte Carlo methods, Society for Industrial and Applied Mathematics, Philadelphia, PA, 1992
	7	Sandilya, S., and S. R. Kulkarni. 1997. Deterministic sufficient conditions for convergence of simultaneous perturbation stochastic approximation algorithms. The 9th INFORMS Applied Probability Conference, Boston, MA.
	8	Seberry, J. and M. Yamada. 1992. Hadamard matrices, sequences, and block designs. In Contemporary Design Theory - A Collection of Surveys (eds. D. J. Stinson and J. Dintiz), pp. 431--560, John Wiley and Sons.
	9	Spall, J. C. 1992. Multivariate stochastic approximation using a simultaneous perturbation gradient approximation. IEEE Transactions on Automatic Control, 37(3):332--341.
	10	James C. Spall, A one-measurement form of simultaneous perturbation stochastic approximation, Automatica (Journal of IFAC), v.33 n.1, p.109-112, Jan. 1997 [doi>10.1016/S0005-1098(96)00149-5]
	11	M. A. Styblinski , T. -S. Tang, Experiments in nonconvex optimization: stochastic approximation with function smoothing and simulated annealing, Neural Networks, v.3 n.4, p.467-483, 1990 [doi>10.1016/0893-6080(90)90029-K]
	12	Wang, I-J., E. K. P. Chong, and S. R. Kulkarni. 1996. Equivalent necessary and sufficient conditions on noise sequences for stochastic approximation algorithms. Advances in Applied Probability, 28:784--801.
	13	Wang, I-J., E. K. P. Chong, and S. R. Kulkarni. 1997. Weighted averaging and stochastic approximation. Mathematics of Control, Signals, and Systems, 10(1): 41--60.
	14	Wang, I-J. and E.K.P. Chong. 1998. A deterministic analysis of stochastic approximation with randomized directions. IEEE Transactions on Automatic Control, 43(12):1745--1749.

CITED BY 3

	Levente Kocsis , Csaba Szepesvári, Universal parameter optimisation in games based on SPSA, Machine Learning, v.63 n.3, p.249-286, June 2006
	Jamie R. Wieland , Bruce W. Schmeiser, Stochastic gradient estimation using a single design point, Proceedings of the 37th conference on Winter simulation, December 03-06, 2006, Monterey, California
	Mohammed Shahid Abdulla , Shalabh Bhatnagar, SPSA algorithms with measurement reuse, Proceedings of the 37th conference on Winter simulation, December 03-06, 2006, Monterey, California

Collaborative Colleagues:

Xiaoping Xiong: colleagues

I-Jeng Wang: colleagues

Michael C. Fu: colleagues

Adobe Acrobat

QuickTime

Windows Media Player

Real Player