Decompositions of CSBPs via Poissonian Intertwining
Abstract
We revisit certain decompositions of continuous-state branching processes (CSBPs), commonly referred to as skeletal decompositions, through the lens of intertwining of semi-groups. Precisely, we associate to a CSBP X with branching mechanism a family of R+× Z+-valued branching processes (Xλ, Lλ), indexed by a parameter λ ∈ (0, ∞), that satisfies an intertwining relationship with X through the Poisson kernel with parameter λ x. The continuous component Xλ has the same law as X, while the discrete component Lλ, conditionally on Xλt, has a Poisson distribution with parameter λ Xλt. The law of (Xλ, Lλ) depends on the position of λ within [0, ∞) = [0, ) [, ∞), where is the largest positive root of . When λ ≥ , various well-known results concerning skeleton decompositions are recovered. In the supercritical case ( > 0), when λ<, a novel phenomenon arises: a birth term appears in the skeleton, corresponding to a one-unit proportional immigration from the continuous to the discrete component. Along the way, the class of continuous-time branching processes taking values in R+ × Z+ is constructed.
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