A criterion for convergence to super-Brownian motion on path space

IF 2.1 1区数学 Q1 STATISTICS & PROBABILITY

Annals of Probability Pub Date : 2017-01-01 DOI:10.1214/14-aop953

R. Hofstad, Mark Holmes, E. Perkins

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引用次数: 11

Abstract

We give a sufficient condition for tightness for convergence of rescaled critical spatial structures to the canonical measure of super-Brownian motion. This condition is formulated in terms of the rr-point functions for r=2,…,5r=2,…,5. The rr-point functions describe the expected number of particles at given times and spatial locations, and have been investigated in the literature for many high-dimensional statistical physics models, such as oriented percolation and the contact process above 4 dimensions and lattice trees above 8 dimensions. In these settings, convergence of the finite-dimensional distributions is known through an analysis of the rr-point functions, but the lack of tightness has been an obstruction to proving convergence on path space. We apply our tightness condition first to critical branching random walk to illustrate the method as tightness here is well known. We then use it to prove tightness for sufficiently spread-out lattice trees above 8 dimensions, thus proving that the measure-valued process describing the distribution of mass as a function of time converges in distribution to the canonical measure of super-Brownian motion. We conjecture that the criterion will also apply to other statistical physics models.

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路径空间上收敛到超布朗运动的一个判据

给出了重标临界空间结构收敛于超布朗运动规范测度的严密性的充分条件。这个条件用r=2，…，5r=2，…，5的r点函数表示。rr-point函数描述了给定时间和空间位置的期望粒子数，并已在许多高维统计物理模型中进行了研究，例如定向渗透和4维以上的接触过程以及8维以上的晶格树。在这些情况下，通过对rr点函数的分析可知有限维分布的收敛性，但缺乏紧密性一直是证明路径空间收敛性的障碍。我们首先将紧性条件应用于临界分支随机漫步来说明该方法，因为这里的紧性是众所周知的。然后，我们用它证明了8维以上充分展开的晶格树的紧密性，从而证明了描述质量分布作为时间函数的测量值过程在分布上收敛于超布朗运动的规范度量。我们推测，该准则也将适用于其他统计物理模型。

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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来源期刊

Annals of Probability 数学-统计学与概率论

CiteScore

4.60

自引率

8.70%

发文量

审稿时长

6-12 weeks

期刊介绍： The Annals of Probability publishes research papers in modern probability theory, its relations to other areas of mathematics, and its applications in the physical and biological sciences. Emphasis is on importance, interest, and originality – formal novelty and correctness are not sufficient for publication. The Annals will also publish authoritative review papers and surveys of areas in vigorous development.