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Abstract
This paper considers a state-dependent M/M/$c$/$c+r$ retrial queue
with Bernoulli abandonment, where the number of servers is equal to
$c$, the capacity of the buffer is equal to $r$ and that of the
virtual waiting room (called orbit) for the retrial customers is infinite.
We assume that the arrival,
service and retrial rates depend on the number of customers in the
system (the servers and buffer).
In this paper, we first present the ergodic condition
for our retrial queue. Then, by a continued fraction approach, we
derive analytical solutions for the stationary joint distribution of
the queue lengths in the system and in the orbit, assuming that
the capacity of the system is less than or equal to 4. We further show
that our analytical solutions can be computed with any desired accuracy.
Finally, we present some numerical results to show the
impact of the parameters on the performance of the system.
Mathematics Subject Classification: Primary: 68M20, 90B22; Secondary: 60K25.
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