Queueing systems, Volume 2
Presents and develops methods from queueing theory in mathematical language and in sufficient depth so that the student may apply the methods to many modern engineering problems and conduct creative research. Step-by-step development of results with careful explanation, and lists of important results make it useful as a handbook and a text.
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A Queueing Theory Primer
The Queue GMm 241
Bounds Inequalities and Approximations
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allocation ARPANET arrival rate assume attained service average number average waiting backlog behavior bribe buffer calculate capacity channel channel capacity computer networks computer systems condition conservation law consider CSMA curves customer arrives define denote destination IMP diffusion approximation equation equilibrium example exponentially distributed finite flow fluid approximation given in Eq HOST independent input interarrival interval KBPS KLEI Kleinrock Laplace transform length linear costs lower bound M/G/l system mean wait node number of customers optimal optimum packet switching parameters Poisson process priority group priority queueing probability problem processor-sharing quantum queueing discipline Queueing Models queueing system queueing theory random variable RFNM routing procedure scheduling algorithm sec of service Section server service time distribution shown in Figure slotted ALOHA solution source IMP tagged customer terminal throughput time-shared traffic transmission upper bound users variance zero