Explicit steady state solutions for a particular M(x)/M/1 queueing system
暂无分享,去创建一个
An explicit steady state solution is determined for the distribution of the number of customers for a queueing system in which Poisson arrivals are bulks of random size. The number of customers per bulk varies randomly between 1 and m, m arbitrary, according to a point multinomial, and customer service is exponential. Queue characteristics are given.
[1] Carl M. Harris,et al. Some Results for Bulk-Arrival Queues with State-Dependent Service Times , 1970 .
[2] Carl M. Harris,et al. Fundamentals of queueing theory , 1975 .
[3] D. Gaver. Imbedded Markov Chain Analysis of a Waiting-Line Process in Continuous Time , 1959 .
[4] William Feller,et al. An Introduction to Probability Theory and Its Applications , 1967 .