Abstract
The classical output theorem for the M/M/1 queue, due to Burke (1956), states that the departure process from a stationary M/M/1 queue, in equilibrium, has the same law as the arrivals process, that is, it is a Poisson process. We show that the associated measure-preserving transformation is metrically isomorphic to a two-sided Bernoulli shift. We also discuss some extensions of Burke’s theorem where it remains an open problem to determine if, or under what conditions, the analogue of this result holds.
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APA
Keane, M., & O’Connell, N. (2008). The M/M/1 queue is bernoulli. Colloquium Mathematicum, 110(1), 205–210. https://doi.org/10.4064/cm110-1-9
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