Open, Closed, and Mixed Networks of Queues with Different Classes of Customers
Journal of the ACM (JACM)
Improvements in the design and performance of the ARPA network
AFIPS '72 (Fall, part II) Proceedings of the December 5-7, 1972, fall joint computer conference, part II
Analysis of an Open Tandem Queueing Network with Population Constraint and Constant Service Times
MASCOTS '95 Proceedings of the 3rd International Workshop on Modeling, Analysis, and Simulation of Computer and Telecommunication Systems
Product Form Queueing Networks
Performance Evaluation: Origins and Directions
Congestion Control of Packet Communication Networks by Input Buffer Limits A Simulation Study
IEEE Transactions on Computers
Erlang loss bounds for OT---ICU systems
Queueing Systems: Theory and Applications
SFM'07 Proceedings of the 7th international conference on Formal methods for performance evaluation
Queueing networks with blocking: analysis, solution algorithms and properties
Network performance engineering
Research: Admission-control techniques with application to broadband networks
Computer Communications
Deterministic algorithm for VP assignment in ATM networks
Computer Communications
Congestion control of packet-switched networks with three types of input buffer limits
Computer Communications
'Stop = recirculate' for exponential product form queueing networks with departure blocking
Operations Research Letters
Operations Research Letters
Proceedings of the 2013 Summer Computer Simulation Conference
Proceedings of the 5th ACM/SPEC international conference on Performance engineering
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The class of queuing networks with multiple routing subchains is extended to include mechanisms of state-dependent lost arrivals and triggered arrivals. A sufficient condition is found, involving the loss and trigger functions, for the equilibrium network state probability distribution to have the product form; the known class of queuing networks with a product form solution is thus enlarged. Such queuing networks are useful models for systems with various population size constraints. Potential applications to modeling computer communication systems with storage and flow control constraints are indicated.