Local limits of conditioned Galton-Watson trees: The condensation case

Romain Abraham; Jean François Delmas

doi:10.1214/EJP.v19-3164

Local limits of conditioned Galton-Watson trees: The condensation case

Romain Abraham
, Jean François Delmas

conventionnée avec l'Université d'Orléans

Résultats de recherche: Contribution à un journal › Article › Revue par des pairs

Résumé

We provide a complete picture of the local convergence of critical or sub-critical Galton-Watson trees conditioned on having a large number of individuals with out-degree in a given set. The generic case, where the limit is a random tree with an infinite spine has been treated in a previous paper. We focus here on the non-generic case, where the local limit is a random tree with a node with infinite out-degree. This case corresponds to the so-called condensation phenomenon.

langue originale	Anglais
Numéro d'article	2
journal	Electronic Journal of Probability
Volume	19
Les DOIs	https://doi.org/10.1214/EJP.v19-3164
état	Publié - 3 janv. 2014

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10.1214/EJP.v19-3164

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title = "Local limits of conditioned Galton-Watson trees: The condensation case",

abstract = "We provide a complete picture of the local convergence of critical or sub-critical Galton-Watson trees conditioned on having a large number of individuals with out-degree in a given set. The generic case, where the limit is a random tree with an infinite spine has been treated in a previous paper. We focus here on the non-generic case, where the local limit is a random tree with a node with infinite out-degree. This case corresponds to the so-called condensation phenomenon.",

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KW - Branching process

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KW - Local-limit

KW - Non-extinction

KW - Random tree

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Local limits of conditioned Galton-Watson trees: The condensation case

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