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Literature DB >> 27853819

Sur les processus linéaires de naissance et de mort sous-critiques dans un environnement aléatoire.

Abstract

An explicit formula is found for the rate of extinction of subcritical linear birth-and-death processes in a random environment. The formula is illustrated by numerical computations of the eigenvalue with largest real part of the truncated matrix for the master equation. The generating function of the corresponding eigenvector satisfies a Fuchsian system of singular differential equations. A particular attention is set on the case of two environments, which leads to Riemann's differential equation.

Keywords: Eigenvalue problem; Fuchsian differential equation; Quasi-birth-and-death process; Random environment

Mesh：

Year: 2016 PMID： 27853819 DOI： 10.1007/s00285-016-1079-0

Source DB: PubMed Journal: J Math Biol ISSN： 0303-6812 Impact factor: 2.259

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References

4 in total

Sur les processus linéaires de naissance et de mort sous-critiques dans un environnement aléatoire.

1. Birth and death processes with random environments in continuous time.

2. On linear birth-and-death processes in a random environment.

3. Stochastic epidemic models with random environment: quasi-stationarity, extinction and final size.

4. Le modèle stochastique SIS pour une épidémie dans un environnement aléatoire.