Optimization via adaptive sampling and regenerative simulation

We investigate a new approach for simulation-based optimization that draws on two recent stochastic optimization methods: an adaptive sampling approach called the nested partitions method and ordinal optimization. An ordinal comparison perspective is used to show that the nested partitions method converges globally under weak conditions. Furthermore, we use those results to determine a lower bound for the required sampling effort in each iteration, and show that global convergence requires relatively little simulation effort in each iteration.

[1]  L. Dai Convergence properties of ordinal comparison in the simulation of discrete event dynamic systems , 1995 .

[2]  Leyuan Shi,et al.  Nested Partitions Method for Global Optimization , 2000, Oper. Res..

[3]  D. Yan,et al.  Stochastic discrete optimization , 1992 .

[4]  Leyuan Shi,et al.  An integrated framework for deterministic and stochastic optimization , 1997, WSC '97.

[5]  Z. Tang Adaptive partitioned random search to global optimization , 1994, IEEE Trans. Autom. Control..

[6]  Mahmoud H. Alrefaei,et al.  Accelerating the convergence of the stochastic ruler method for discrete stochastic optimization , 1997, WSC '97.

[7]  Yu-Chi Ho,et al.  Ordinal optimization of DEDS , 1992, Discret. Event Dyn. Syst..

[8]  Sigrún Andradóttir,et al.  A review of simulation optimization techniques , 1998, 1998 Winter Simulation Conference. Proceedings (Cat. No.98CH36274).

[9]  Leyuan Shi,et al.  Stopping criterion for a simulation-based optimization method , 1998, 1998 Winter Simulation Conference. Proceedings (Cat. No.98CH36274).

[10]  Yu-Chi Ho,et al.  Stochastic Comparison Algorithm for Discrete Optimization with Estimation , 1999, SIAM J. Optim..

[11]  S. Andradóttir A method for discrete stochastic optimization , 1995 .

[12]  Leyuan Shi,et al.  Nested Partitions Method for Stochastic Optimization , 2000 .

[13]  S. Andradottir,et al.  Accelerating The Convergence Of The Stochastic Ruler Method For Discrete Stochastic Optimization , 1997, Winter Simulation Conference Proceedings,.

[14]  Theodore T. Allen,et al.  Simulation optimization methods that combine multiple comparisons and genetic algorithms with applications in design for computer and supersaturated experiments , 2001 .