Spectral analysis of Sinai's walk for small eigenvalues
成果类型:
Article
署名作者:
Bovier, Anton; Faggionato, Alessandra
署名单位:
Leibniz Association; Weierstrass Institute for Applied Analysis & Stochastics; Technical University of Berlin; Sapienza University Rome
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/009117907000000178
发表日期:
2008
页码:
198-254
关键词:
metastability
diffusion
DYNAMICS
摘要:
Sinai's walk can be thought of as a random walk on Z with random potential V, with V weakly converging under diffusive rescaling to a two-sided Brownian motion. We consider here the generator L-N of Sinai's walk on [-N, N] boolean AND Z with Dirichlet conditions on -N, N. By means of potential theory, for each h > 0, we show the relation between the spectral properties of L-N for eigenvalues of order o(exp(-h root N)) and the distribution of the h-extrema of the rescaled potential V-N(x) V(Nx)/root N definedon [-1, 1]. Information about the h-extrema of V-N is derived from a result of Neveu and Pitman concerning the statistics of h-extrema of Brownian motion. As first application of our results, we give a proof of a refined version of Sinai's localization theorem.
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