论文信息 - Bayesian stopping rules for multistart global optimization methods

Bayesian stopping rules for multistart global optimization methods

By far the most efficient methods for global optimization are based on starting a local optimization routine from an appropriate subset of uniformly distributed starting points. As the number of local optima is frequently unknown in advance, it is a crucial problem when to stop the sequence of sampling and searching. By viewing a set of observed minima as a sample from a generalized multinomial distribution whose cells correspond to the local optima of the objective function, we obtain the posterior distribution of the number of local optima and of the relative size of their regions of attraction. This information is used to construct sequential Bayesian stopping rules which find the optimal trade off between reliability and computational effort.

[1] Robert L. Smith,et al. Hit-and-run algorithms for the identification of nonredundant linear inequalities , 1987, Math. Program..

[2] Alexander H. G. Rinnooy Kan,et al. A stochastic method for global optimization , 1982, Math. Program..

[3] Ryszard Zieliński,et al. A sequential Bayesian approach to estimating the dimension of a multinomial distribution , 1985 .

[4] A.H.G. Rinnooy Kan,et al. BAYESIAN MULTINOMIAL ESTIMATION OF ANIMAL POPULATION SIZE , 1983 .

[5] C. G. E. Boender,et al. A Bayesian Analysis of the Number of Cells of a Multinomial Distribution , 1983 .

[6] Ryszard Zielinski. A statistical estimate of the structure of multi-extremal problems , 1981, Math. Program..

[7] Alan J. Mayne,et al. Towards Global Optimisation 2 , 1976 .

[8] Leen Stougie,et al. Global optimization : a stochastic approach , 1980 .

[9] Cornelis Gustaaf Eduard Boender,et al. The generalized multinomial distribution : a Bayesian analysis and applications , 1984 .

[10] David Lindley,et al. Optimal Statistical Decisions , 1971 .