随机森林在$d\geqslant 3$中的渗透过渡

IF 2.6 1区 数学 Q1 MATHEMATICS
Roland Bauerschmidt, Nicholas Crawford, Tyler Helmuth
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引用次数: 0

摘要

arboreal气体是一个图中(无根跨度)森林的概率度量,在这个图中,每个森林的每条边都被一个因子(\beta >0\)加权。它是\(p=\beta q\) 状态随机簇模型的\(q\to 0\) 极限。我们证明,在(d/geqslant 3)维度上,树栖气体会发生渗滤相变。我们分析的出发点是arboreal气体与目标空间为费米双曲面的非线性西格玛模型之间的精确关系。后一种模型可以看作是 0 状态的波茨模型,树状气体是它的随机簇表示。与标准波茨模型不同,(\mathbb{H}^{0|2}\)模型具有连续对称性。通过将重正化群分析与沃德特性相结合,我们证明了这一对称性在低温下被自发打破。就树状气体而言,这种对称性破缺转化为热力学极限下无限树的存在。我们的分析还建立了低温下的无质量自由场关联以及有限环上宏观树的存在。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Percolation transition for random forests in $d\geqslant 3$

Percolation transition for random forests in $d\geqslant 3$

The arboreal gas is the probability measure on (unrooted spanning) forests of a graph in which each forest is weighted by a factor \(\beta >0\) per edge. It arises as the \(q\to 0\) limit of the \(q\)-state random cluster model with \(p=\beta q\). We prove that in dimensions \(d\geqslant 3\) the arboreal gas undergoes a percolation phase transition. This contrasts with the case of \(d=2\) where no percolation transition occurs.

The starting point for our analysis is an exact relationship between the arboreal gas and a non-linear sigma model with target space the fermionic hyperbolic plane \(\mathbb{H}^{0|2}\). This latter model can be thought of as the 0-state Potts model, with the arboreal gas being its random cluster representation. Unlike the standard Potts models, the \(\mathbb{H}^{0|2}\) model has continuous symmetries. By combining a renormalisation group analysis with Ward identities we prove that this symmetry is spontaneously broken at low temperatures. In terms of the arboreal gas, this symmetry breaking translates into the existence of infinite trees in the thermodynamic limit. Our analysis also establishes massless free field correlations at low temperatures and the existence of a macroscopic tree on finite tori.

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来源期刊
Inventiones mathematicae
Inventiones mathematicae 数学-数学
CiteScore
5.60
自引率
3.20%
发文量
76
审稿时长
12 months
期刊介绍: This journal is published at frequent intervals to bring out new contributions to mathematics. It is a policy of the journal to publish papers within four months of acceptance. Once a paper is accepted it goes immediately into production and no changes can be made by the author(s).
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