论文信息 - The Solution of the Single-Channel Queuing Equations Characterized by a Time-Dependent Poisson-Distributed Arrival Rate and a General Class of Holding Times

The Solution of the Single-Channel Queuing Equations Characterized by a Time-Dependent Poisson-Distributed Arrival Rate and a General Class of Holding Times

The single-channel queuing equations considered in this paper are characterized by a Poisson-distributed arrival rate and a general class of holding-time distributions. General solutions of the equations are obtained for the case in which the traffic intensity i is a continuous function of time and possesses continuous derivatives of all orders. The following particular cases are considered in detail a i constant and the holding-time distribution Pearson type-III in this case the general solution is obtained in closed form in terms of a newly introduced function Inkz, many of the properties of which are derived in the Appendix, b i directly proportional to time and the holding time exponentially distributed.

G. Luchak

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