Queueing Systems: Theory and Applications
Retrial queues with server subject to breakdown and repairs
Queueing Systems: Theory and Applications - Special issue of queueing systems, theory and applications
Discrete-Time Models for Communication Systems Including ATM
Discrete-Time Models for Communication Systems Including ATM
An M/G/1 queue with second optional service
Queueing Systems: Theory and Applications
Reliability Analysis of the Retrial Queue with Server Breakdowns and Repairs
Queueing Systems: Theory and Applications
A Single Server Poisson Input Queue with a Second Optional Channel
Queueing Systems: Theory and Applications
A Discrete-Time Geo/G/1 Retrial Queue with General Retrial Times
Queueing Systems: Theory and Applications
An M/G/1 queue with second optional service and server breakdowns
Computers & Mathematics with Applications
Steady-state queue size distribution of discrete-time PH/Geo/1 retrial queues
Mathematical and Computer Modelling: An International Journal
Accessible bibliography on retrial queues
Mathematical and Computer Modelling: An International Journal
Performance evaluation of a discrete-time Geo[X]/G/1 retrial queue with general retrial times
Computers & Mathematics with Applications
A batch arrival retrial queueing system with two phases of service and service interruption
Computers & Mathematics with Applications
Journal of Computational and Applied Mathematics
Performance Analysis of a Block-Structured Discrete-Time Retrial Queue with State-Dependent Arrivals
Discrete Event Dynamic Systems
A discrete-time Geo/G/1 retrial queue with starting failures and impatient customers
Transactions on computational science VII
Comparative analysis of a randomized N-policy queue: An improved maximum entropy method
Expert Systems with Applications: An International Journal
Discrete-time Geo1,GeoX2/G1,G2/1 retrial queue with two classes of customers and feedback
Mathematical and Computer Modelling: An International Journal
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We consider a discrete-time Geo/G/1 retrial queue with starting failures in which all the arriving customers require a first essential service while only some of them ask for a second optional service. We study the Markov chain underlying the considered queueing system and its ergodicity condition. Explicit formulae for the stationary distribution and some performance measures of the system in steady state are obtained. We also obtain two stochastic decomposition laws regarding the probability generating function of the system size. Finally, some numerical examples are presented to illustrate the influence of the parameters on several performance characteristics.