First-crossing times of linear boundaries by Poisson processes are considered. In particular, the moment generating functions of stopping times of the form are examined, where is a homogeneous Poisson counting process and . Exact and asymptotic (in B) expressions are obtained by analyzing certain delay-differential equations derived for this moment generating function by Dvoretsky, Kiefer and Wolfowitz. Further results are obtained for the case of a single, lower boundary by exploiting results of Zacks who gives a series representation for the stopping-time distribution in this case. These results are used to obtain a closed-form expression for the cumulants of the stopping time in this latter case
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