A universality class in Markovian persistence
Abstract
We consider the class of Markovian processes defined by the equation x / t = -β x + Σk zk δ (t-tk). Such processes are encountered in systems (like coalescing systems) where dynamics creates discrete upward jumps at random instants tk and of random height zk. We observe that the probability for these processes to remain above their mean value during an interval of time T decays as -θ T defining θ as the persistence exponent. We show that θ takes the value β which thereby extends the well known result of the Gaussian noise case to a much larger class of non-Gaussian processes.
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