Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Lambert, Amaury
2005.
The branching process with logistic growth.
The Annals of Applied Probability,
Vol. 15,
Issue. 2,
Lambert, Amaury
2007.
Quasi-Stationary Distributions and the Continuous-State Branching Process Conditioned to Be Never Extinct.
Electronic Journal of Probability,
Vol. 12,
Issue. none,
Cyran, Krzysztof A.
and
Kimmel, Marek
2010.
Alternatives to the Wright–Fisher model: The robustness of mitochondrial Eve dating.
Theoretical Population Biology,
Vol. 78,
Issue. 3,
p.
165.
Lambert, Amaury
2010.
The contour of splitting trees is a Lévy process.
The Annals of Probability,
Vol. 38,
Issue. 1,
Chen, Yu-Ting
and
Delmas, Jean-François
2012.
Smaller population size at the MRCA time for stationary branching processes.
The Annals of Probability,
Vol. 40,
Issue. 5,
Lambert, Amaury
and
Popovic, Lea
2013.
The coalescent point process of branching trees.
The Annals of Applied Probability,
Vol. 23,
Issue. 1,
Hong, Jyy-I
2013.
Coalescence in Subcritical Bellman-Harris Age-Dependent Branching Processes.
Journal of Applied Probability,
Vol. 50,
Issue. 2,
p.
576.
Hong, Jyy-I
2013.
Coalescence in Subcritical Bellman-Harris Age-Dependent Branching Processes.
Journal of Applied Probability,
Vol. 50,
Issue. 2,
p.
576.
Roitershtein, Alexander
and
Zhong, Zheng
2013.
On random coefficient INAR(1) processes.
Science China Mathematics,
Vol. 56,
Issue. 1,
p.
177.
Bi, Hongwei
2014.
Time to most recent common ancestor for stationary continuous state branching processes with immigration.
Frontiers of Mathematics in China,
Vol. 9,
Issue. 2,
p.
239.
Le, V.
2014.
Coalescence Times for the Bienaymé-Galton-Watson Process.
Journal of Applied Probability,
Vol. 51,
Issue. 1,
p.
209.
Le, V.
2014.
Coalescence Times for the Bienaymé-Galton-Watson Process.
Journal of Applied Probability,
Vol. 51,
Issue. 1,
p.
209.
Grosjean, Nicolas
and
Huillet, Thierry
2016.
On a coalescence process and its branching genealogy.
Journal of Applied Probability,
Vol. 53,
Issue. 4,
p.
1156.
Iyer, Gautam
Leger, Nicholas
and
Pego, Robert L.
2018.
Coagulation and universal scaling limits for critical Galton–Watson processes.
Advances in Applied Probability,
Vol. 50,
Issue. 2,
p.
504.
Liu, Minzhi
and
Vatutin, Vladimir Alekseevich
2018.
Редуцированные критические ветвящиеся процессы для малых популяций.
Теория вероятностей и ее применения,
Vol. 63,
Issue. 4,
p.
795.
Grosjean, Nicolas
and
Huillet, Thierry
2018.
On the genealogy and coalescence times of Bienaymé–Galton–Watson branching processes.
Stochastic Models,
Vol. 34,
Issue. 1,
p.
1.
Vatutin, Vladimir Alekseevich
Hong, W
and
Ji, Yao
2018.
Редуцированные критические ветвящиеся процессы Беллмана-Харриса для малых популяций.
Дискретная математика,
Vol. 30,
Issue. 3,
p.
25.
Foucart, Clément
Ma, Chunhua
and
Mallein, Bastien
2019.
Coalescences in continuous-state branching processes.
Electronic Journal of Probability,
Vol. 24,
Issue. none,
Burden, Conrad J.
and
Soewongsono, Albert C.
2019.
Coalescence in the diffusion limit of a Bienaymé–Galton–Watson branching process.
Theoretical Population Biology,
Vol. 130,
Issue. ,
p.
50.
Huillet, Thierry E.
2019.
The height of the latest common ancestor of two randomly chosen leaves from a (sub-)critical Galton–Watson tree.
Advances in Applied Mathematics,
Vol. 106,
Issue. ,
p.
28.