CONVERGENCE OF DIRICHLET FORMS FOR MCMC OPTIMAL SCALING WITH DEPENDENT TARGET DISTRIBUTIONS ON LARGE GRAPHS
成果类型:
Article
署名作者:
Ning, Ning
署名单位:
Texas A&M University System; Texas A&M University College Station
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/24-AAP2131
发表日期:
2025
页码:
898-935
关键词:
walk metropolis algorithm
WEAK-CONVERGENCE
摘要:
Markov chain Monte Carlo (MCMC) algorithms have played a significant role in statistics, physics, machine learning and others, and they are the only known general and efficient approach for some high-dimensional problems. The random walk Metropolis (RWM) algorithm as the most classical MCMC algorithm, has had a great influence on the development and practice of science and engineering. The behavior of the RWM algorithm in high-dimensional problems is typically investigated through a weak convergence result of diffusion processes. In this paper, we utilize the Mosco convergence of Dirichlet forms in analyzing the RWM algorithm on large graphs, whose target distribution is the Gibbs measure that includes any probability measure satisfying a Markov property. The abstract and powerful theory of Dirichlet forms allows us to work directly and naturally on the infinite-dimensional space, and our notion of Mosco convergence allows Dirichlet forms associated with the RWM chains to lie on changing Hilbert spaces. Through the optimal scaling problem, we demonstrate the impressive strengths of the Dirichlet form approach over the standard diffusion approach.
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