Spread rate of catalytic branching symmetric stable processes
Abstract
We study the growth order of the maximal displacement of branching symmetric α-stable processes. We assume the branching rate measure μ is in the Kato class and μ has a compact support on Rd. We show that the maximal displacement exponentially grows and its order is determined by the index α and the spectral bottom of the corresponding Schr\"odinger-type operator.
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