Analysis and Optimization of Certain Parallel Monte Carlo Methods in the Low Temperature Limit

P. Dupuis, Guo-Jhen Wu
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引用次数: 3

Abstract

Metastability is a formidable challenge to Markov chain Monte Carlo methods. In this paper we present methods for algorithm design to meet this challenge. The design problem we consider is temperature selection for the infinite swapping scheme, which is the limit of the widely used parallel tempering scheme obtained when the swap rate tends to infinity. We use a recently developed tool for the analysis of the empirical measure of a small noise diffusion to transform the variance reduction problem into an explicit optimization problem. Our first analysis of the optimization problem is in the setting of a double well model, and it shows that the optimal selection of temperature ratios is a geometric sequence except possibly the highest temperature. In the same setting we identify two different sources of variance reduction, and show how their competition determines the optimal highest temperature. In the general multi-well setting we prove that a pure geometric sequence of temperature ratios is always nearly optimal, with a performance gap that decays geometrically in the number of temperatures.
低温极限下若干并行蒙特卡罗方法的分析与优化
亚稳态是马尔可夫链蒙特卡罗方法面临的一个巨大挑战。在本文中,我们提出了应对这一挑战的算法设计方法。我们考虑的设计问题是无限交换方案的温度选择,这是广泛使用的并行回火方案在交换速率趋于无穷大时的极限。我们使用最近开发的工具来分析小噪声扩散的经验度量,将方差缩减问题转化为显式优化问题。我们首先在双井模型下对优化问题进行了分析,结果表明,除了最高温度外,温度比的最优选择是一个几何序列。在相同的环境下,我们确定了两种不同的方差减少来源,并展示了它们的竞争如何决定最优最高温度。在一般的多井环境中,我们证明了温度比的纯几何序列总是接近最优的,其性能差距随着温度的数量呈几何衰减。
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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