重正化泊松势下退火布朗运动负指数矩的渐近性

International Journal of Stochastic Analysis Pub Date : 2011-06-28 DOI:10.1155/2011/803683

Xia Chen, A. Kulik

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引用次数: 15

摘要

在(Chen和Kulik, 2009)中，提出了一种重整化方法，用于在泊松云中构造一些更物理真实的随机势。本文详细分析了重归一化泊松势下布朗运动的退火负指数矩的渐近行为。应用本文的主要结果，研究了以重整泊松势表示的随机薛定谔算子的积分态密度的Lifshitz尾渐近性。

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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Asymptotics of Negative Exponential Moments for Annealed Brownian Motion in a Renormalized Poisson Potential

In (Chen and Kulik, 2009), a method of renormalization was proposed for constructing some more physically realistic random potentials in a Poisson cloud. This paper is devoted to the detailed analysis of the asymptotic behavior of the annealed negative exponential moments for the Brownian motion in a renormalized Poisson potential. The main results of the paper are applied to studying the Lifshitz tails asymptotics of the integrated density of states for random Schrodinger operators with their potential terms represented by renormalized Poisson potentials.

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International Journal of Stochastic Analysis

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