Weak convergence of the extremes of branching L\'evy processes with regularly varying tails
Abstract
In this paper, we study the weak convergence of the extremes of supercritical branching L\'evy processes \Xt, t 0\ whose spatial motions are L\'evy processes with regularly varying tails. The result is drastically different from the case of branching Brownian motions. We prove that, when properly renormalized, Xt converges weakly. As a consequence, we obtain a limit theorem for the order statistics of Xt.
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