Your search keyword '"extinction criterion"' showing total 2 results

1. Lyapunov Exponents for Branching Processes in a Random Environment: The Effect of Information.

Author

Hautphenne, Sophie and Latouche, Guy

Subjects

*LYAPUNOV exponents, *MATRICES (Mathematics), *MARKOV random fields, *EXPONENTS, *MATHEMATICAL bounds

Abstract

We consider multitype branching processes evolving in a Markovian random environment. To determine whether or not the branching process becomes extinct almost surely is akin to computing the maximal Lyapunov exponent of a sequence of random matrices, which is a notoriously difficult problem. We define Markov chains associated to the branching process, and we construct bounds for the Lyapunov exponent. The bounds are obtained by adding or by removing information: to add information results in a lower bound, to remove information results in an upper bound, and we show that adding less information improves the lower bound. We give a few illustrative examples and we observe that the upper bound is generally more accurate than the lower bounds. [ABSTRACT FROM AUTHOR]

Published

2016

2. Extinction in lower Hessenberg branching processes with countably many types

Author

Sophie Hautphenne and Peter Braunsteins

Subjects

Statistics and Probability, extinction criterion, growth, random-walks, rates, Second moment of area, galton-watson process, Fixed point, Type (model theory), survival, 01 natural sciences, Combinatorics, 010104 statistics & probability, 60J05, FOS: Mathematics, Quantitative Biology::Populations and Evolution, 60J22, Continuum (set theory), 0101 mathematics, Mathematics, Sequence, 60J80, varying environment, Probability (math.PR), 010102 general mathematics, Generating function, Random walk, Physics::Classical Physics, Galton–Watson process, fixed point, Physics::Space Physics, extinction probability, Statistics, Probability and Uncertainty, Mathematics - Probability, Infinite-type branching process

Abstract

We consider a class of branching processes with countably many types which we refer to as Lower Hessenberg branching processes. These are multitype Galton–Watson processes with typeset $\mathcal{X}=\{0,1,2,\ldots\}$, in which individuals of type $i$ may give birth to offspring of type $j\leq i+1$ only. For this class of processes, we study the set $S$ of fixed points of the progeny generating function. In particular, we highlight the existence of a continuum of fixed points whose minimum is the global extinction probability vector $\boldsymbol{q}$ and whose maximum is the partial extinction probability vector $\boldsymbol{\tilde{q}}$. In the case where $\boldsymbol{\tilde{q}}=\boldsymbol{1}$, we derive a global extinction criterion which holds under second moment conditions, and when $\boldsymbol{\tilde{q}}

Published

2019