Replace-after-Fixed-or-Random-Time Extensions of the Poisson Process

Abstract

We analyze extensions of the Poisson process in which any interarrival time that exceeds a fixed value r is counted as an interarrival of duration r. In the engineering application that initiated this work, one part is tested at a time, and N(t) is the number of parts that, by time t, have either failed, or if they have reached age r while still functioning, have been replaced. We refer to \N(t), t ≥ 0\ as a replace-after-fixed-time process. We extend this idea to the case where the replacement time for the process is itself random, and refer to the resulting doubly stochastic process as a replace-after-random-time process.