Queueing-inventory systems with catastrophes under various replenishment policies
View/ Open
Access
info:eu-repo/semantics/openAccessAttribution 3.0 United Stateshttp://creativecommons.org/licenses/by/3.0/us/Date
2023Metadata
Show full item recordAbstract
We discuss two queueing-inventory systems with catastrophes in the warehouse. Catastrophes occur according to the Poisson process and instantly destroy all items in the inventory. The
arrivals of the consumer customers follow a Markovian arrival process and they can be queued in an
infinite buffer. The service time of a consumer customer follows a phase-type distribution. The system
receives negative customers which have Poisson flows and as soon as a negative customer comes into
the system, he causes a consumer customer to leave the system, if any. One of two inventory policies
is used in the systems: either (s, S) or (s, Q). If the inventory level is zero when a consumer customer
arrives, then this customer is either lost (lost sale) or joins the queue (backorder sale). The system
is formulated by a four-dimensional continuous-time Markov chain. Ergodicity condition for both
systems is established and steady-state distribution is obtained using the matrix-geometric method.
By numerical studies, the influence of the distributions of the arrival process and the service time
and the system parameters on performance measures are deeply analyzed. Finally, an optimization
study is presented in which the criterion is the minimization of expected total costs and the controlled
parameter is warehouse capacity.
Source
MathematicsVolume
11Issue
23The following license files are associated with this item: