Abstract
In this paper, we study the matched queueing system with a double input, M o M/PH/1, where the two inputs are two independent Poisson processes, and the service time is of PH-distribution. The L.S. transforms and the expectations of the distributions of occupation time and virtual waiting time of the type-1 customer are derived. The probability that the server is working, the mean non-idle period, and the mean busy period are also derived. The related algorithms are given with numerical results.
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