Optimal potential functions for the interacting particle system method

IF 0.8 Q3 STATISTICS & PROBABILITY
H. Chraibi, A. Dutfoy, T. Galtier, J. Garnier
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引用次数: 4

Abstract

Abstract The assessment of the probability of a rare event with a naive Monte Carlo method is computationally intensive, so faster estimation or variance reduction methods are needed. We focus on one of these methods which is the interacting particle system (IPS) method. The method is not intrusive in the sense that the random Markov system under consideration is simulated with its original distribution, but selection steps are introduced that favor trajectories (particles) with high potential values. An unbiased estimator with reduced variance can then be proposed. The method requires to specify a set of potential functions. The choice of these functions is crucial because it determines the magnitude of the variance reduction. So far, little information was available on how to choose the potential functions. This paper provides the expressions of the optimal potential functions minimizing the asymptotic variance of the estimator of the IPS method and it proposes recommendations for the practical design of the potential functions.
相互作用粒子系统方法的最优势函数
摘要利用朴素蒙特卡罗方法评估罕见事件的概率需要大量的计算量,因此需要更快的估计或减少方差的方法。本文重点介绍了其中一种方法,即相互作用粒子系统(IPS)方法。该方法并不具有侵入性,因为所考虑的随机马尔可夫系统是用其原始分布来模拟的,但引入了有利于具有高势值的轨迹(粒子)的选择步骤。然后可以提出一个方差减小的无偏估计量。该方法要求指定一组势函数。这些函数的选择是至关重要的,因为它决定了方差减少的幅度。到目前为止,关于如何选择潜在函数的信息很少。本文给出了使IPS方法估计量渐近方差最小的最优势函数的表达式,并对势函数的实际设计提出了建议。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Monte Carlo Methods and Applications
Monte Carlo Methods and Applications STATISTICS & PROBABILITY-
CiteScore
1.20
自引率
22.20%
发文量
31
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