遍历无标度随机环境的一个不变性原理

IF 4.9 1区 数学 Q1 MATHEMATICS Acta Mathematica Pub Date : 2018-07-19 DOI:10.4310/acta.2022.v228.n2.a2
Ewain Gwynne, Jason Miller, S. Sheffield
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引用次数: 10

摘要

有许多经典的随机环境中的随机行走结果适用于遍历随机平面环境。我们将其中的一些结果扩展到随机环境中,在随机环境中长度尺度随地点而变化,因此在某种意义上,环境定律仅是平移不变的模尺度。就我们的目的而言,“环境”由嵌入$\mathbb C$中的无限随机平面图组成,其每条边都具有正实电导。我们的主要结果是,在适度的约束条件下(平移不变性模缩放以及一类特定能量的有限性),这种环境中的随机行走收敛于淬火意义上的布朗运动模时间参数化。在随机平面图和刘维尔量子引力的研究中,这种类型的环境自然产生。事实上,本文的结果被用于单独的工作中,以证明某些随机平面图(通过所谓的Tutte嵌入嵌入在平面中)具有SLE修饰的刘维尔量子引力给出的标度极限,并且还提供了布朗图上布朗运动的更显式的构造。然而,本文的结果要普遍得多,可以独立于该程序阅读。我们的主要结果的一个一般结果是,如果平移不变量(模缩放)随机嵌入平面图及其对偶的每面积能量有限,那么它们在大尺度上接近最小能量嵌入(谐波嵌入)。为了建立无限能量嵌入的布朗运动收敛性,只要证明可以扰动它使能量有限就足够了。
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An invariance principle for ergodic scale-free random environments
There are many classical random walk in random environment results that apply to ergodic random planar environments. We extend some of these results to random environments in which the length scale varies from place to place, so that the law of the environment is in a certain sense only translation invariant modulo scaling. For our purposes, an "environment" consists of an infinite random planar map embedded in $\mathbb C$, each of whose edges comes with a positive real conductance. Our main result is that under modest constraints (translation invariance modulo scaling together with the finiteness of a type of specific energy) a random walk in this kind of environment converges to Brownian motion modulo time parameterization in the quenched sense. Environments of the type considered here arise naturally in the study of random planar maps and Liouville quantum gravity. In fact, the results of this paper are used in separate works to prove that certain random planar maps (embedded in the plane via the so-called Tutte embedding) have scaling limits given by SLE-decorated Liouville quantum gravity, and also to provide a more explicit construction of Brownian motion on the Brownian map. However, the results of this paper are much more general and can be read independently of that program. One general consequence of our main result is that if a translation invariant (modulo scaling) random embedded planar map and its dual have finite energy per area, then they are close on large scales to a minimal energy embedding (the harmonic embedding). To establish Brownian motion convergence for an infinite energy embedding, it suffices to show that one can perturb it to make the energy finite.
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来源期刊
Acta Mathematica
Acta Mathematica 数学-数学
CiteScore
6.00
自引率
2.70%
发文量
6
审稿时长
>12 weeks
期刊介绍: Publishes original research papers of the highest quality in all fields of mathematics.
期刊最新文献
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