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Hauptverfasser: Angel, Omer, Sénizergues, Delphin
Format: Preprint
Veröffentlicht: 2023
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2312.14640
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author Angel, Omer
Sénizergues, Delphin
author_facet Angel, Omer
Sénizergues, Delphin
contents In this paper we prove a scaling limit result for the component of the root in the Wired Minimal Spanning Forest (WMSF) of the Poisson-Weighted Infinite Tree (PWIT), where the latter tree arises as the local weak limit of the Minimal Spanning Tree (MST) on the complete graph endowed with i.i.d. weights on its edges. The limiting object can be obtained by aggregating independent Brownian trees using two types of gluing procedures: one that we call the Brownian tree aggregation process and resembles the so-called stick-breaking construction of the Brownian tree; and another one that we call the chain construction, which simply corresponds to gluing a sequence of metric spaces along a line.
format Preprint
id arxiv_https___arxiv_org_abs_2312_14640
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle The scaling limit of the root component in the Wired Minimal Spanning Forest of the Poisson Weighted Infinite Tree
Angel, Omer
Sénizergues, Delphin
Probability
In this paper we prove a scaling limit result for the component of the root in the Wired Minimal Spanning Forest (WMSF) of the Poisson-Weighted Infinite Tree (PWIT), where the latter tree arises as the local weak limit of the Minimal Spanning Tree (MST) on the complete graph endowed with i.i.d. weights on its edges. The limiting object can be obtained by aggregating independent Brownian trees using two types of gluing procedures: one that we call the Brownian tree aggregation process and resembles the so-called stick-breaking construction of the Brownian tree; and another one that we call the chain construction, which simply corresponds to gluing a sequence of metric spaces along a line.
title The scaling limit of the root component in the Wired Minimal Spanning Forest of the Poisson Weighted Infinite Tree
topic Probability
url https://arxiv.org/abs/2312.14640