Discrete approximations to reflected Brownian motion
成果类型:
Article
署名作者:
Burdzy, Krzysztof; Chen, Zhen-Qing
署名单位:
University of Washington; University of Washington Seattle
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/009117907000000240
发表日期:
2008
页码:
698-727
关键词:
diffusion-processes
domains
摘要:
In this paper we investigate three discrete or semi-discrete approximation schemes for reflected Brownian motion on bounded Euclidean domains. For a class of bounded domains D in R-n that includes all bounded Lipschitz domains and the von Koch snowflake domain, we show that the laws of both discrete and continuous time simple random walks on D boolean AND 2(-k)Z(n) moving at the rate 2(-2k) with stationary initial distribution converge weakly in the space D([0, 1], R-n), equipped with the Skorokhod topology, to the law of the stationary reflected Brownian motion on D. We further show that the following myopic conditioning algorithm generates, in the limit, a reflected Brownian motion on any bounded domain D. For every integer k >= 1, let {X-k (j2-k), j = 0, 1 2...} be a discrete time Markov chain with one-step transition probabilities being the same as those for the Brownian motion in D conditioned not to exit D before time 2(-k). We prove that the laws of Xk converge to that of the reflected Brownian motion on D. These approximation schemes give not only new ways of constructing reflected Brownian motion but also implementable algorithms to simulate reflected Brownian motion.