Ergodic Behavior of Locally Regulated Branching Populations

Ergodic Behavior of Locally Regulated Branching Populations

For a class of processes modeling the evolution of a spatially structured population with migration and a logistic local regulation of the reproduction dynamics, we show convergence to an upper invariant measure from a suitable class of initial distributions. It follows from recent work of Alison Et...

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Veröffentlicht in:The Annals of applied probability 2007-04, Vol.17 (2), p.474-501
Hauptverfasser: Hutzenthaler, M., Wakolbinger, A.
Format: Artikel
Sprache:eng
Schlagworte:
60J60
60J80
60K35
92D25
branching populations
Brownian motion
ergodic behavior
Ergodic theory
extinction
Interacting diffusions
local competition
Logistic growth
Logistics
Markov processes
Mathematical theorems
Population migration
Population size
Probabilities
Uniqueness
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Beschreibung
Zusammenfassung:For a class of processes modeling the evolution of a spatially structured population with migration and a logistic local regulation of the reproduction dynamics, we show convergence to an upper invariant measure from a suitable class of initial distributions. It follows from recent work of Alison Etheridge that this upper invariant measure is nontrivial for sufficiently large super-criticality in the reproduction. For sufficiently small super-criticality, we prove local extinction by comparison with a mean field model. This latter result extends also to more general local reproduction regulations.
ISSN:1050-5164
2168-8737
DOI:10.1214/105051606000000745