On the Passage Time Geometry of the Last Passage Percolation Problem

Pub Date : 2021-01-01 DOI:10.30757/alea.v18-10
Tom Alberts, E. Cator
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引用次数: 1

Abstract

We analyze the geometrical structure of the passage times in the last passage percolation model. Viewing the passage time as a piecewise linear function of the weights we determine the domains of the various pieces, which are the subsets of the weight space that make a given path the longest one. We focus on the case when all weights are assumed to be positive, and as a result each domain is a pointed polyhedral cone. We determine the extreme rays, facets, and two-dimensional faces of each cone, and also review a well-known simplicial decomposition of the maximal cones via the so-called order cone. All geometric properties are derived using arguments phrased in terms of the last passage model itself. Our motivation is to understand path probabilities of the extremal corner paths on rectangles in Z, but all of our arguments apply to general, finite partially ordered sets.
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关于最后通道渗流问题的通过时间几何
我们分析了最后一种通道渗流模型中通道时间的几何结构。将通过时间视为权重的分段线性函数,我们确定了各个块的域,这些块是权重空间的子集,使给定路径成为最长的路径。我们关注的是假设所有的权值都是正的,因此每个域都是一个尖多面体锥的情况。我们确定了每个锥体的极端射线、切面和二维面,并通过所谓的有序锥体回顾了一个众所周知的最大锥体的简单分解。所有几何属性都是使用根据最后通道模型本身措辞的参数派生的。我们的动机是理解Z上矩形的极值角路径的路径概率,但我们所有的论点都适用于一般的有限部分有序集合。
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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