齐次空间上随机游动的一些渐近性质

IF 0.7 1区数学 Q2 MATHEMATICS

Journal of Modern Dynamics Pub Date : 2021-04-27 DOI:10.3934/jmd.2023004

Timoth'ee B'enard

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引用次数: 3

摘要

设$G$是一个具有有限中心的连通半单实李群，$\mu$是$G$上的一个概率测度，其支持生成$G$的Zariski稠密子群。我们考虑$G$上正确的$\mu$-随机行走，并证明每个随机轨迹的大部分时间都花在精心选择的Weyl腔的有界距离上。我们推断，如果$G$具有秩1，并且$\mu$具有有限的一阶矩，那么对于任何离散子群$\Lambda\substeqG$，$\Lambda \substeq G$上的$\mu$-行走和测地流要么都是瞬态的，要么都是递归的和遍历的，从而扩展了Hopf Tsuji Sullivan Kaimanovich处理布朗运动的一个众所周知的定理。

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Some asymptotic properties of random walks on homogeneous spaces

Let $G$ be a connected semisimple real Lie group with finite center, and $\mu$ a probability measure on $G$ whose support generates a Zariski-dense subgroup of $G$. We consider the right $\mu$-random walk on $G$ and show that each random trajectory spends most of its time at bounded distance of a well-chosen Weyl chamber. We infer that if $G$ has rank one, and $\mu$ has a finite first moment, then for any discrete subgroup $\Lambda \subseteq G$, the $\mu$-walk and the geodesic flow on $\Lambda \backslash G$ are either both transient, or both recurrent and ergodic, thus extending a well known theorem due to Hopf-Tsuji-Sullivan-Kaimanovich dealing with the Brownian motion.

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来源期刊

Journal of Modern Dynamics 数学-数学

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Modern Dynamics (JMD) is dedicated to publishing research articles in active and promising areas in the theory of dynamical systems with particular emphasis on the mutual interaction between dynamics and other major areas of mathematical research, including: Number theory Symplectic geometry Differential geometry Rigidity Quantum chaos Teichmüller theory Geometric group theory Harmonic analysis on manifolds. The journal is published by the American Institute of Mathematical Sciences (AIMS) with the support of the Anatole Katok Center for Dynamical Systems and Geometry at the Pennsylvania State University.