Abstract
We consider d-dimensional stochastic processes which take values in (R+)d. These processes generalize Galton-Watson branching processes, but the main assumption of branching processes, independence between particles, is dropped. Instead, we assume for some Here τ: (R+)d → R+, |x| = Σ1d |x(i)| A = {x ∈ (R+)d: |x| = 1} and T: A → A. Under various assumptions on the maps τ and T it is shown that with probability one there exists a ρ > 1, a fixed point p ∈ A of T and a random variable w such that limn→∞Znρ−n = wp. This result is a generalization of the main limit theorem for super-critical branching processes; note, however, that in the present situation both p and ρ are random as well. The results are applied to a population genetical model for zygotic selection without mutation at one locus.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,Statistics and Probability
Reference27 articles.
1. The assumption (3.4) in [9] differs slightly from (1.5) under conditions (1.4). One can, however, obtain it immediately from (1.5), by taking γ = |Zn |½δ when |Zn ≧ max (K 0, K 1 −2/δ). But for |Zn < max (K 0, K 1 −2/δ) (3.4) in [9] is automatic when K ≧ max (K 0 δ, K 1 −2).
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