The Kesten-Stigum Theorem for the one-type Galton-Watson process gives necessary and sufficient conditions for mean convergence of the martingale formed by the population size normed by its expectation. Here, the approach to this theorem pioneered by Lyons, Peres and Pemantle (1995) is extended to certain kinds of martingales defined for Galton-Watson processes with a general type space. Many examples satisfy stochastic domination conditions on the offspring distributions and suitable domination conditions combine nicely with general conditions for mean convergence to produce moment conditions, like the X logX condition of the Kesten-Stigum Theorem. A general treatment of this phenomenon is given. The application of the approach to various ...
In this thesis, we use multitype Galton-Watson branching processes in random environments as individ...
AbstractA functional central limit theorem is obtained for martingales which are not uniformly asymp...
We investigate the x log x condition for a general (Crump–Mode–Jagers) multi-type branching process ...
The Kesten-Stigum Theorem for the one-type Galton-Watson process gives necessary and sufficient cond...
The branching random walk is a Galton-Watson process with the additional feature that pe...
A generalization of Biggins Martingale Convergence Theorem is proved for the multitype branching ran...
We investigate the x logx condition for a general (Crump–Mode–Jagers) multi-type branching process w...
Let (Z_n , n ≥ 0) be a supercritical Galton-Watson process whose offspring distribution µ has mean λ...
This paper considers the asymptotic theory of the varying environment Galton-Watson process with a c...
AbstractAllowing an offspring probability distribution that has infinite variances, we establish the...
A general method is developed with which various theorems on the mean square convergence of function...
Consider a supercritical d-type branching process $Z_n^{i} = $ $ (Z_n^i(1), \cdots, Z_n^i(d)), \...
AbstractThis paper considers the asymptotic theory of the varying environment Galton–Watson process ...
AbstractA martingale, previously used to prove the classical almost sure convergence of the normed s...
Renormalized sequences of Galton Watson processes converge to Continuous State Branching Processes (...
In this thesis, we use multitype Galton-Watson branching processes in random environments as individ...
AbstractA functional central limit theorem is obtained for martingales which are not uniformly asymp...
We investigate the x log x condition for a general (Crump–Mode–Jagers) multi-type branching process ...
The Kesten-Stigum Theorem for the one-type Galton-Watson process gives necessary and sufficient cond...
The branching random walk is a Galton-Watson process with the additional feature that pe...
A generalization of Biggins Martingale Convergence Theorem is proved for the multitype branching ran...
We investigate the x logx condition for a general (Crump–Mode–Jagers) multi-type branching process w...
Let (Z_n , n ≥ 0) be a supercritical Galton-Watson process whose offspring distribution µ has mean λ...
This paper considers the asymptotic theory of the varying environment Galton-Watson process with a c...
AbstractAllowing an offspring probability distribution that has infinite variances, we establish the...
A general method is developed with which various theorems on the mean square convergence of function...
Consider a supercritical d-type branching process $Z_n^{i} = $ $ (Z_n^i(1), \cdots, Z_n^i(d)), \...
AbstractThis paper considers the asymptotic theory of the varying environment Galton–Watson process ...
AbstractA martingale, previously used to prove the classical almost sure convergence of the normed s...
Renormalized sequences of Galton Watson processes converge to Continuous State Branching Processes (...
In this thesis, we use multitype Galton-Watson branching processes in random environments as individ...
AbstractA functional central limit theorem is obtained for martingales which are not uniformly asymp...
We investigate the x log x condition for a general (Crump–Mode–Jagers) multi-type branching process ...