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Main Author: Khanfir, Robin
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2208.11528
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author Khanfir, Robin
author_facet Khanfir, Robin
contents In order to study convergences of looptrees, we construct continuum trees and looptrees from real-valued càdlàg functions without negative jumps called excursions. We then provide a toolbox to manipulate the two resulting codings of metric spaces by excursions and we formalize the principle that jumps correspond to loops and that continuous growths correspond to branches. Combining these codings creates new metric spaces from excursions that we call vernation trees. They consist of a collection of loops and trees glued along a tree structure so that they unify trees and looptrees. We also propose a topological definition for vernation trees, which yields what we argue to be the right space to study convergences of looptrees. However, those first codings lack some functional continuity, so we adjust them. We thus obtain several limit theorems. Finally, we present some probabilistic applications, such as proving an invariance principle for random discrete looptrees.
format Preprint
id arxiv_https___arxiv_org_abs_2208_11528
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Convergences of looptrees coded by excursions
Khanfir, Robin
Probability
Metric Geometry
60F17, 54C30, 54E70, 05C05, 54F50
In order to study convergences of looptrees, we construct continuum trees and looptrees from real-valued càdlàg functions without negative jumps called excursions. We then provide a toolbox to manipulate the two resulting codings of metric spaces by excursions and we formalize the principle that jumps correspond to loops and that continuous growths correspond to branches. Combining these codings creates new metric spaces from excursions that we call vernation trees. They consist of a collection of loops and trees glued along a tree structure so that they unify trees and looptrees. We also propose a topological definition for vernation trees, which yields what we argue to be the right space to study convergences of looptrees. However, those first codings lack some functional continuity, so we adjust them. We thus obtain several limit theorems. Finally, we present some probabilistic applications, such as proving an invariance principle for random discrete looptrees.
title Convergences of looptrees coded by excursions
topic Probability
Metric Geometry
60F17, 54C30, 54E70, 05C05, 54F50
url https://arxiv.org/abs/2208.11528