ABSTRACT
The progress of science and technology has placed Queueing Theory among the most popular disciplines in applied mathematics, operations research, and engineering. Although queueing has been on the scientific market since the beginning of this century, it is still rapidly expanding by capturing new areas in technology. Advances in Queueing provides a comprehensive overview of problems in this enormous area of science and focuses on the most significant methods recently developed.
Written by a team of 24 eminent scientists, the book examines stochastic, analytic, and generic methods such as approximations, estimates and bounds, and simulation. The first chapter presents an overview of classical queueing methods from the birth of queues to the seventies. It also contains the most comprehensive bibliography of books on queueing and telecommunications to date. Each of the following chapters surveys recent methods applied to classes of queueing systems and networks followed by a discussion of open problems and future research directions.
Advances in Queueing is a practical reference that allows the reader quick access to the latest methods.
TABLE OF CONTENTS
part 1|220 pages
Stochastic Methods
part II|114 pages
Analytic Methods
chapter Chapter 11|18 pages
Explicit Wiener-Hopf factorizations for the analysis of multidimensional queues
chapter Chapter 13|16 pages
The spectral expansion solution method for Markov processes on lattice strips
chapter Chapter 14|24 pages
Applications of vector Riemann boundary value problems to analysis of queueing systems
part III|130 pages
Approximation, Estimates, and Simulation of Queues