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A Stochastic Approximation Algorithm with Varying Bounds

Author

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  • Sigrún Andradóttir

    (University of Wisconsin, Madison, Wisconsin and Georgia Institute of Technology, Atlanta, Georgia)

Abstract

Many optimization problems that are intractable with conventional approaches will yield to stochastic approximation algorithms. This is because these algorithms can be used to optimize functions that cannot be evaluated analytically, but have to be estimated (for instance, through simulation) or measured. Thus, stochastic approximation algorithms can be used for optimization in simulation. Unfortunately, the classical stochastic approximation algorithm sometimes diverges because of unboundedness problems. We study the convergence of a variant of stochastic approximation defined over a growing sequence of compact sets. We show that this variant converges under more general conditions on the objective function than the classical algorithm, while maintaining the same asymptotic convergence rate. We also present empirical evidence that shows that this algorithm sometimes converges much faster than the classical algorithm.

Suggested Citation

  • Sigrún Andradóttir, 1995. "A Stochastic Approximation Algorithm with Varying Bounds," Operations Research, INFORMS, vol. 43(6), pages 1037-1048, December.
  • Handle: RePEc:inm:oropre:v:43:y:1995:i:6:p:1037-1048
    DOI: 10.1287/opre.43.6.1037
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    Cited by:

    1. Kao, Chiang & Chen, Shih-Pin, 2006. "A stochastic quasi-Newton method for simulation response optimization," European Journal of Operational Research, Elsevier, vol. 173(1), pages 30-46, August.
    2. Chen, Shih-Pin, 2007. "Solving fuzzy queueing decision problems via a parametric mixed integer nonlinear programming method," European Journal of Operational Research, Elsevier, vol. 177(1), pages 445-457, February.
    3. Sumit Kunnumkal & Huseyin Topaloglu, 2008. "Exploiting the Structural Properties of the Underlying Markov Decision Problem in the Q-Learning Algorithm," INFORMS Journal on Computing, INFORMS, vol. 20(2), pages 288-301, May.
    4. Yanwei Jia, 2024. "Continuous-time Risk-sensitive Reinforcement Learning via Quadratic Variation Penalty," Papers 2404.12598, arXiv.org.

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