Pruning Galton–Watson trees and tree-valued Markov processes

Romain Abraham; Jean-François Delmas; Hui He

Annales de l'I.H.P. Probabilités et statistiques (2012)

  • Volume: 48, Issue: 3, page 688-705
  • ISSN: 0246-0203

Abstract

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We present a new pruning procedure on discrete trees by adding marks on the nodes of trees. This procedure allows us to construct and study a tree-valued Markov process { 𝒢 ( u ) } by pruning Galton–Watson trees and an analogous process { 𝒢 * ( u ) } by pruning a critical or subcritical Galton–Watson tree conditioned to be infinite. Under a mild condition on offspring distributions, we show that the process { 𝒢 ( u ) } run until its ascension time has a representation in terms of { 𝒢 * ( u ) } . A similar result was obtained by Aldous and Pitman (Ann. Inst. H. Poincaré Probab. Statist.34 (1998) 637–686) in the special case of Poisson offspring distributions where they considered uniform pruning of Galton–Watson trees by adding marks on the edges of trees.

How to cite

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Abraham, Romain, Delmas, Jean-François, and He, Hui. "Pruning Galton–Watson trees and tree-valued Markov processes." Annales de l'I.H.P. Probabilités et statistiques 48.3 (2012): 688-705. <http://eudml.org/doc/271979>.

@article{Abraham2012,
abstract = {We present a new pruning procedure on discrete trees by adding marks on the nodes of trees. This procedure allows us to construct and study a tree-valued Markov process $\lbrace \mathcal \{G\}(u)\rbrace $ by pruning Galton–Watson trees and an analogous process $\lbrace \mathcal \{G\}^\{*\}(u)\rbrace $ by pruning a critical or subcritical Galton–Watson tree conditioned to be infinite. Under a mild condition on offspring distributions, we show that the process $\lbrace \mathcal \{G\}(u)\rbrace $ run until its ascension time has a representation in terms of $\lbrace \mathcal \{G\}^\{*\}(u)\rbrace $. A similar result was obtained by Aldous and Pitman (Ann. Inst. H. Poincaré Probab. Statist.34 (1998) 637–686) in the special case of Poisson offspring distributions where they considered uniform pruning of Galton–Watson trees by adding marks on the edges of trees.},
author = {Abraham, Romain, Delmas, Jean-François, He, Hui},
journal = {Annales de l'I.H.P. Probabilités et statistiques},
keywords = {pruning; branching process; Galton–Watson process; random tree; ascension process; Galton-Watson process},
language = {eng},
number = {3},
pages = {688-705},
publisher = {Gauthier-Villars},
title = {Pruning Galton–Watson trees and tree-valued Markov processes},
url = {http://eudml.org/doc/271979},
volume = {48},
year = {2012},
}

TY - JOUR
AU - Abraham, Romain
AU - Delmas, Jean-François
AU - He, Hui
TI - Pruning Galton–Watson trees and tree-valued Markov processes
JO - Annales de l'I.H.P. Probabilités et statistiques
PY - 2012
PB - Gauthier-Villars
VL - 48
IS - 3
SP - 688
EP - 705
AB - We present a new pruning procedure on discrete trees by adding marks on the nodes of trees. This procedure allows us to construct and study a tree-valued Markov process $\lbrace \mathcal {G}(u)\rbrace $ by pruning Galton–Watson trees and an analogous process $\lbrace \mathcal {G}^{*}(u)\rbrace $ by pruning a critical or subcritical Galton–Watson tree conditioned to be infinite. Under a mild condition on offspring distributions, we show that the process $\lbrace \mathcal {G}(u)\rbrace $ run until its ascension time has a representation in terms of $\lbrace \mathcal {G}^{*}(u)\rbrace $. A similar result was obtained by Aldous and Pitman (Ann. Inst. H. Poincaré Probab. Statist.34 (1998) 637–686) in the special case of Poisson offspring distributions where they considered uniform pruning of Galton–Watson trees by adding marks on the edges of trees.
LA - eng
KW - pruning; branching process; Galton–Watson process; random tree; ascension process; Galton-Watson process
UR - http://eudml.org/doc/271979
ER -

References

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  1. [1] R. Abraham and J.-F. Delmas. Fragmentation associated with Lévy processes using snake. Probab. Theory Related Fields141 (2008) 113–154. Zbl1142.60048MR2372967
  2. [2] R. Abraham and J.-F. Delmas. A continuum-tree-valued Markov process. Ann. Probab.40 (2012) 1167–1211. Zbl1252.60072MR2962090
  3. [3] D. Aldous. The continuum random tree I. Ann. Probab.19 (1991) 1–28. Zbl0722.60013MR1085326
  4. [4] D. Aldous and J. Pitman. Tree-valued Markov chains derived from Galton–Watson processes. Ann. Inst. H. Poincaré Probab. Statist.34 (1998) 637–686. Zbl0917.60082MR1641670
  5. [5] K. B. Athreya and P. E. Ney. Branching Processes. Die Grundlehren der Mathematischen Wissenschaften 196. Springer, New York, 1972. Zbl0259.60002MR373040
  6. [6] H. Kesten. Subdiffusive behavior of random walk on a random cluster. Ann. Inst. H. Poincaré Probab. Statist.22 (1987) 425–487. Zbl0632.60106MR871905
  7. [7] J.-F. Le Gall. Random trees and applications. Probab. Surv.2 (2005) 245–311. Zbl1189.60161MR2203728
  8. [8] G. Miermont. Self-similar fragmentations derived from the stable tree. II. Splitting at nodes. Probab. Theory Related Fields 131 (2005) 341–375. Zbl1071.60065MR2123249
  9. [9] J. Neveu. Arbres et processus de Galton–Watson. Ann. Inst. H. Poincaré Probab. Statist.22 (1986) 199–207. Zbl0601.60082MR850756

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