Exponential moments of first passage times and related quantities for random walks
Abstract
For a zero-delayed random walk on the real line, let τ(x), N(x) and (x) denote the first passage time into the interval (x,∞), the number of visits to the interval (-∞,x] and the last exit time from (-∞,x], respectively. In the present paper, we provide ultimate criteria for the finiteness of exponential moments of these quantities. Moreover, whenever these moments are finite, we derive their asymptotic behaviour, as x ∞.
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