Ergodicity of the BMAP/PH/s/s+K Retrial Queue
with PH-Retrial Times
Define the traffic intensity as the ratio of the arrival rate to the service rate. This paper
shows that the BMAP/PH/s/s+K retrial queue with PHretrial times is ergodic if and only if its
traffic intensity is less than one. The result implies that the BMAP/PH/s/s+K retrial queue with
PHretrial times and the corresponding BMAP/PH/s queue have the same condition for
ergodicity, a fact which has been believed for a long time without rigorous proof. This paper also
shows that the same condition is necessary and sufficient for two modified retrial queueing
systems to be ergodic. In addition, conditions for ergodicity of two BMAP/PH/s/s+K retrial
queues with PHretrial times and impatient customers are obtained.
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