Duality in the Directed Landscape and Its Applications to Fractal Geometry

Pub Date : 2024-04-08 DOI:10.1093/imrn/rnae051
Manan Bhatia
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Abstract

Geodesic coalescence, or the tendency of geodesics to merge together, is a hallmark phenomenon observed in a variety of planar random geometries involving a random distortion of the Euclidean metric. As a result of this, the union of interiors of all geodesics going to a fixed point tends to form a tree-like structure that is supported on a vanishing fraction of the space. Such geodesic trees exhibit intricate fractal behaviour; for instance, while almost every point in the space has only one geodesic going to the fixed point, there exist atypical points that admit two such geodesics. In this paper, we consider the directed landscape, the recently constructed [ 18] scaling limit of exponential last passage percolation (LPP), with the aim of developing tools to analyse the fractal aspects of the tree of semi-infinite geodesics in a given direction. We use the duality [ 39] between the geodesic tree and the interleaving competition interfaces in exponential LPP to obtain a duality between the geodesic tree and the corresponding dual tree in the landscape. Using this, we show that problems concerning the fractal behaviour of sets of atypical points for the geodesic tree can be transformed into corresponding problems for the dual tree, which might turn out to be easier. In particular, we use this method to show that the set of points admitting two semi-infinite geodesics in a fixed direction a.s. has Hausdorff dimension $4/3$, thereby answering a question posed in [ 12]. We also show that the set of points admitting three semi-infinite geodesics in a fixed direction is a.s. countable.
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有向景观中的对偶性及其在分形几何中的应用
测地线聚合,或者说测地线合并在一起的趋势,是在涉及欧几里得度量随机变形的各种平面随机几何中观察到的一种标志性现象。因此,通向一个固定点的所有大地线的内部结合处往往会形成一个树状结构,并在空间的一个消失部分上得到支持。这种大地树表现出错综复杂的分形行为;例如,虽然空间中几乎每个点都只有一条大地线通向定点,但存在一些非典型点,它们允许两条这样的大地线。在本文中,我们考虑了有向景观,即最近构建的[18]指数最后通道渗滤(LPP)的缩放极限,目的是开发工具来分析给定方向上半无限大地线树的分形方面。我们利用指数 LPP 中测地线树与交织竞争界面之间的对偶性[ 39],得到了测地线树与景观中相应对偶树之间的对偶性。利用这一点,我们证明了有关测地树的非典型点集的分形行为问题可以转化为对偶树的相应问题,这可能会变得更容易。特别是,我们用这种方法证明了在一个固定方向上容纳两个半无限测地线的点集具有豪斯多夫维度 $4/3$,从而回答了[ 12] 中提出的一个问题。我们还证明了在固定方向上容纳三条半无限测地线的点集是可数的。
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