The sustainability probability for the critical Derrida-Retaux model
Abstract
We are interested in the recursive model (Yn, \, n 0) studied by Collet, Eckmann, Glaser and Martin [9] and by Derrida and Retaux [12]. We prove that at criticality, the probability P(Yn>0) behaves like n-2 + o(1) as n goes to infinity; this gives a weaker confirmation of predictions made in [9], [12] and [6]. Our method relies on studying the number of pivotal vertices and open paths, combined with a delicate coupling argument.
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