We consider an extension of the classical machine-repair model, also known as the computer-terminal model or time-sharing model. As opposed to the classical model, we assume that the machines, apart from receiving service from the repairman, supply service themselves to queues of products. The extended model can be viewed as a two-layered queueing network, of which the ¿rst layer consists of two separate queues of products. Each of these queues is served by its own machine. The marginal and joint queue length distributions of the ¿rst-layer queues are hard to analyse in an exact fashion. Therefore, we apply the power-series algorithm to this model to obtain the light-traf¿c behaviour of the queue lengths symbolically. This leads to two accurate approximations for the marginal mean queue length. The ¿rst approximation, based on the light-traf¿c behaviour, is in closed form. The second approximation is based on an interpolation between the light-traf¿c behaviour and heavy-traf¿c results for the mean queue length. The obtained approximations are shown to work well for arbitrary loaded systems. The proposed numerical algorithm and approximations may prove to be very useful for system design and optimisation purposes in application areas such as manufacturing, computer systems and telecommunications.
|Plaats van productie||Eindhoven|
|Status||Gepubliceerd - 2012|
|ISSN van geprinte versie||1389-2355|