LARGE DEVIATIONS FOR THE EMPIRICAL MEASURE OF THE ZIG-ZAG PROCESS
成果类型:
Article
署名作者:
Bierkens, Joris; Nyquist, Pierre; Schlottke, Mikola C.
署名单位:
Delft University of Technology; Royal Institute of Technology; Eindhoven University of Technology
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/21-AAP1663
发表日期:
2021
页码:
2811-2843
关键词:
markov process expectations
asymptotic evaluation
principal eigenvalue
convergence-rates
limit
diffusion
variance
hastings
time
摘要:
The zig-zag process is a piecewise deterministic Markov process in position and velocity space. The process can be designed to have an arbitrary Gibbs type marginal probability density for its position coordinate, which makes it suitable for Monte Carlo simulation of continuous probability distributions. An important question in assessing the efficiency of this method is how fast the empirical measure converges to the stationary distribution of the process. In this paper we provide a partial answer to this question by characterizing the large deviations of the empirical measure from the stationary distribution. Based on the Feng-Kurtz approach, we develop an abstract framework aimed at encompassing piecewise deterministic Markov processes in position-velocity space. We derive explicit conditions for the zig-zag process to allow the Donsker-Varadhan variational formulation of the rate function, both for a compact setting (the torus) and one-dimensional Euclidean space. Finally we derive an explicit expression for the Donsker-Varadhan functional for the case of a compact state space and use this form of the rate function to address a key question concerning the optimal choice of the switching rate of the zig-zag process.
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