Local properties for 1-dimensional critical branching L\'evy process
Abstract
Consider a one dimensional critical branching L\'evy process ((Zt)t≥ 0, Px). Assume that the offspring distribution either has finite second moment or belongs to the domain of attraction to some α-stable distribution with α∈ (1, 2), and that the underlying L\'evy process (t)t≥ 0 is non-lattice and has finite 2+δ* moment for some δ*>0. We first prove that t1α-1(1- Ety(\-1t1α-1-12∫ h(x) Zt(dx) -1t1α-1 ∫ g(xt)Zt(dx)\)) converges as t∞ for any non-negative bounded Lipschtitz function g and any non-negative directly Riemann integrable function h of compact support. Then for any y∈ and bounded Borel set of positive Lebesgue measure with its boundary having zero Lebesgue measure, under a higher moment condition on , we find the decay rate of the probability Pty(Zt(A)>0). As an application, we prove some convergence results for Zt under the conditional law Pty(·| Zt(A)>0).
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