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A Simple Proof of Duquesne’s Theorem on Contour Processes of Conditioned Galton–Watson Trees
Lecture Notes in Mathematics, 2013 We give a simple new proof of a theorem of Duquesne, stating that the properly rescaled contour function of a critical aperiodic Galton-Watson tree, whose offspring distribution is in the domain of attraction of a stable law of index θ ∈ (1, 2 ...
Igor Kortchemski
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Journal of Automated Reasoning, 2001
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
M. Randall Holmes, Jim Alves-Foss
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
M. Randall Holmes, Jim Alves-Foss
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A LIMIT THEOREM FOR THE GALTON‐WATSON PROCESS WITH IMMIGRATION
Australian Journal of Statistics, 1969SummaryIt is difficult, in general, to optain an explicit expression for the limiting‐stationary distribution, when such a distribution exists, of the process in which teh individuals reproduce as in a Galton‐Wastson process, but are also subject to an independent immigration component at each generation.
Quine, M. P., Seneta, E.
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Limit Theorems for the Critical Galton–Watson Processes with Migration
Theory of Probability & Its Applications, 1996Let \(\xi_i^{(n)}\), \(\zeta_n\), \(i=1,2,\dots,\;n=0,1,\dots\), be independent aleatory variables with \(P(\zeta_n=k)=p_k\), \(P(\zeta_n=-r)=q_r\), \(k=0,1,\dots,\;r=1,2,\dots,m\), \(\sum_{k=0}^\infty p_k+\sum_{r=1}^m q_r=1\), and \(\xi_i^{(n)}\), \(i=1,2,\dots,\) are independent identically distributed for every \(n=0,1,\dots\) We consider the ...
Badalbaev, I. S., Yakubov, T. D.
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An extension of Hawkes theorem on the Hausdorff dimension of a Galton–Watson tree
Probability Theory and Related Fields, 2000The genealogical tree of a supercritical multi-type Galton-Watson branching process (simple Galton-Watson process assigned labels from a finite set \(\mathcal L\)) is considered. There is defined the limit set \(\Lambda\) of the simple Galton-Watson process as the set of all infinite descent lines, i.e., the set of infinite sequences \(\xi =\xi_1 \xi_2
Lalley, Steven P., Sellke, Thomas
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Watson's theorem and the $NΔ(1232)$ axial transition
2015We present a new determination of the $NΔ$ axial form factors from neutrino induced pion production data. For this purpose, the model of Hernandez {\it et al.} [Phys. Rev. D76, 033005 (2007)] is improved by partially restoring unitarity. This is accomplished by imposing Watson's theorem on the dominant vector and axial multipoles.
Alvarez-Ruso, L. +3 more
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Renewed Limit Theorems for Noncritical Galton–Watson Branching Systems
Journal of Theoretical ProbabilityThis paper discusses the Galton-Watson stochastic branching system. The authors deal only with the noncritical case. Their goal is to improve the recent results on explicitly calculated famous constant in the theory of subcritical Galton-Watson branching systems (Kolmogorov (1938)).
Azam A. Imomov, Misliddin Murtazaev
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A Watson's Theorem for Double Series
Journal of the London Mathematical Society, 1976openaire +1 more source
A Proof of a Theorem of Watson
Journal of the London Mathematical Society, 1933openaire +2 more sources