The tail of the length of an excursion in a trap of random size
Abstract
Consider a random walk with a drift to the right on \0,…,k\ where k is random and geometrically distributed. We show that the tail P[T>t] of the length T of an excursion from 0 decreases up to constants like t- for some >0 but is not regularly varying. We compute the oscillations of t\,P[T>t] as t∞ explicitly.
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