Abstract
We consider continuous-state branching (CB) processes which become extinct (i.e., hit 0) with positive probability. We characterize all the quasi-stationary distributions (QSD) for the CB-process as a stochastically monotone family indexed by a real number. We prove that the minimal element of this family is the so-called Yaglom quasi-stationary distribution, that is, the limit of one-dimensional marginals conditioned on being nonzero. Next, we consider the branching process conditioned on not being extinct in the distant future, or $Q$-process, defined by means of Doob $h$-transforms. We show that the $Q$-process is distributed as the initial CB-process with independent immigration, and that under the $L\log L$ condition, it has a limiting law which is the size-biased Yaglom distribution (of the CB-process). More generally, we prove that for a wide class of nonnegative Markov processes absorbed at 0 with probability 1, the Yaglom distribution is always stochastically dominated by the stationary probability of the $Q$-process, assuming that both exist. Finally, in the diffusion case and in the stable case, the $Q$-process solves a SDE with a drift term that can be seen as the instantaneous immigration.
Highlights
We study continuous-state branching processes (CB), which are the continuous analogue of Bienayme–Galton–Watson processes (see [4; 9; 16; 19])
CBprocesses can serve as models for population dynamics
We prove that the CB-process Z solves the following stochastic differential equation dZt = Zt1−/αdXt, where X is a spectrally positive Levy process with Laplace exponent ψ, and that the Q-process solves dZt↑ = (Zt↑−)1/αdXt + dσt, where σ is a subordinator with Laplace exponent ψ′ independent of X, which may be seen as the instantaneous immigration
Summary
We study continuous-state branching processes (CB), which are the continuous (in time and space) analogue of Bienayme–Galton–Watson processes (see [4; 9; 16; 19]). We study quasi-stationary distributions, that is, those probability measures ν on (0, ∞) satisfying for any Borel set A. See [39] for a study of Yaglom-type results for the Jirina process (branching process in discrete time and continuous-state space). The mass of the superprocess is a critical CBprocess called the Feller diff√usion, or squared Bessel process of dimension 0 It is a diffusion Z satisfying the SDE dZt = 2 ZtdBt. Properties of the (conditioned) Feller diffusion are studied in particular in [13; 14; 28; 35]. The last section is dedicated to some comments and results on links between the Q-process and the Yaglom distribution, as well as further results in the diffusion as well as stable cases
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