The Palm theory and the Loynes theory of stationary systems are
the two pillars of the modern approach to queuing. This book,
presenting the mathematical foundations of the theory of
stationaryqueuing systems, contains a thorough treatment of both of
these.
This approach helps to clarify the picture, in that it separates
the task of obtaining the key system formulas from that of proving
convergence to a stationary state and computing its law.
The theory is constantly illustrated by classical results and
models: Pollaczek-Khintchin and Tacacs formulas, Jackson and
Gordon-Newell networks, multiserver queues, blocking queues, loss
systems etc., but it also contains recent and significant examples,
where the tools developed turn out to be indispensable.
Several other mathematical tools which are useful within this
approach are also presented, such as the martingale calculus for
point processes, or stochastic ordering for stationary
recurrences.
This thoroughly revised second edition contains substantial
additions - in particular, exercises and their solutions -
rendering this now classic reference suitable for use as a
textbook.
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