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The Critical Galton-Watson Process Without Further Power Moments

Part of: Markov processes Limit theorems

Published online by Cambridge University Press:  14 July 2016

S. V. Nagaev  and
V. Wachtel
S. V. Nagaev*
Affiliation:
Sobolev Institute for Mathematics
V. Wachtel*
Affiliation:
Weierstrass Institute for Applied Analysis and Stochastics
*
Postal address: Sobolev Institute for Mathematics, Prospect Akademika Koptjuga 4, 630090 Novosibirsk, Russia.
∗∗Postal address: Technische Universität München, Zentrum Mathematik, Bereich M5, TU München, 85747 Garching, Germany. Email address: wachtel@ma.tum.de
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Abstract

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In this paper we prove a conditional limit theorem for a critical Galton-Watson branching process {Zn; n ≥ 0} with offspring generating function s + (1 − s)L((1 − s)−1), where L(x) is slowly varying. In contrast to a well-known theorem of Slack (1968), (1972) we use a functional normalization, which gives an exponential limit. We also give an alternative proof of Sze's (1976) result on the asymptotic behavior of the nonextinction probability.

Keywords

Critical Galton-Watson processconditional theoremslowly varying function

MSC classification

Secondary: 60J80: Branching processes (Galton-Watson, birth-and-death, etc.) 60F05: Central limit and other weak theorems

Information

Type
Research Article
Information
Journal of Applied Probability , Volume 44 , Issue 3 , September 2007 , pp. 753 - 769
Copyright
Copyright © Applied Probability Trust 2007 

References

[1] Bondarenko, E. M. and Topchii, V. A. (2001). Estimates for expectation of the maximum of a critical Galton–Watson process on a finite interval. Siberian Math. J. 42, 209216.Google Scholar
[2] Borovkov, K. A. (1988). A method for the proof of limit theorems for branching processes. Teor. Verojatn. i Primenen 33, 115123.Google Scholar
[3] Darling, D. A. (1952). The influence of the maximum term in the addition of independent random variables. Trans. Amer. Math. Soc. 73, 95107.Google Scholar
[4] Darling, D. A. (1970). The Galton–Watson process with infinite mean. J. Appl. Prob. 7, 455456.Google Scholar
[5] Hudson, I. L. and Seneta, E. (1977). A note on simple branching processes with infinite mean. J. Appl. Prob. 14, 836842.CrossRefGoogle Scholar
[6] Schuh, H.-J. and Barbour, A. D. (1977). On the asymptotic behaviour of branching processes with infinite mean. Adv. Appl. Prob. 9, 681723.CrossRefGoogle Scholar
[7] Seneta, E (1976). Regularly Varying Functions (Lecture Notes Math. 508). Springer, Berlin.CrossRefGoogle Scholar
[8] Slack, R. S. (1968). A branching process with mean one and possibly infinite variance. Z. Wahrscheinlichkeitsth. 9, 139145.Google Scholar
[9] Slack, R. S. (1972). Further notes on branching process with mean one. Z. Wahrscheinlichkeitsth. 25, 3138.Google Scholar
[10] Sze, M. (1976). Markov processes associated with critical Galton–Watson processes with application to extinction probability. Adv. Appl. Prob. 8, 278295.Google Scholar
[11] Zubkov, A. M. (1975). Limit distributions of the distance to the nearest common ancestor. Teor. Verojatn. i Primenen 20, 614623.Google Scholar