论文信息 - Monte Carlo Integration Using Importance Sampling and Gibbs Sampling

Monte Carlo Integration Using Importance Sampling and Gibbs Sampling

To evaluate the expectation of a simple function with respect to a complicated multivariate density Monte Carlo integration has become the main technique. Gibbs sampling and importance sampling are the most popular methods for this task. In this contribution we propose a new simple general purpose importance sampling procedure. In a simulation study we compare the performance of this method with the performance of Gibbs sampling and of importance sampling using a vector of independent variates. It turns out that the new procedure is much better than independent importance sampling; up to dimension five it is also better than Gibbs sampling. The simulation results indicate that for higher dimensions Gibbs sampling is superior. (author's abstract)

W. Hörmann | J. Leydold

[1] Editors , 1986, Brain Research Bulletin.

[2] L. Devroye. Non-Uniform Random Variate Generation , 1986 .

[3] J. Geweke,et al. Bayesian Inference in Econometric Models Using Monte Carlo Integration , 1989 .

[4] W. Gilks,et al. Adaptive Rejection Sampling for Gibbs Sampling , 1992 .

[5] Man-Suk Oh,et al. Integration of Multimodal Functions by Monte Carlo Importance Sampling , 1993 .

[6] B. Schmeiser,et al. Performance of the Gibbs, Hit-and-Run, and Metropolis Samplers , 1993 .

[7] John Geweke,et al. Monte carlo simulation and numerical integration , 1995 .

[8] T. Hesterberg,et al. Weighted Average Importance Sampling and Defensive Mixture Distributions , 1995 .

[9] Ping Zhang. Nonparametric Importance Sampling , 1996 .

[10] A. Raftery,et al. Local Adaptive Importance Sampling for Multivariate Densities with Strong Nonlinear Relationships , 1996 .

[11] Peter Green,et al. Markov chain Monte Carlo in Practice , 1996 .

[12] A. Owen,et al. Safe and Effective Importance Sampling , 2000 .