Discrete optimization via approximate annealing adaptive search with stochastic averaging

Author

Hu, Jiaqiao ; Wang, Chen

Author_Institution

Dept. of Appl. Math. & Stat., State Univ. of New York at Stony Brook, Stony Brook, NY, USA

fYear

2011

fDate

11-14 Dec. 2011

Firstpage

4201

Lastpage

4211

Abstract

We propose a random search algorithm for black-box optimization with discrete decision variables. The algorithm is based on the recently introduced Model-based Annealing Random Search (MARS) for global optimization, which samples candidate solutions from a sequence of iteratively focusing distribution functions over the solution space. In contrast with MARS, which requires a sample size (number of candidate solutions) that grows at least polynomially with the number of iterations for convergence, our approach employs a stochastic averaging idea and uses only a small constant number of candidate solutions per iteration. We establish global convergence of the proposed algorithm and provide numerical examples to illustrate its performance.

Keywords

convergence; iterative methods; optimisation; search problems; stochastic processes; approximate annealing adaptive search; black box optimization; convergence; discrete decision variables; discrete optimization; global optimization; iterations; model based annealing random search; random search algorithm; stochastic averaging; Adaptation models; Annealing; Boltzmann distribution; Convergence; Mars; Optimization; Stochastic processes;

fLanguage

English

Publisher

ieee

Conference_Titel

Simulation Conference (WSC), Proceedings of the 2011 Winter

Conference_Location

Phoenix, AZ

ISSN

0891-7736

Print_ISBN

978-1-4577-2108-3

Electronic_ISBN

0891-7736

Type

conf

DOI

10.1109/WSC.2011.6148108

Filename

6148108