Layered queueing network
In queueing theory, a discipline within the mathematical theory of probability, a layered queueing network (or rendezvous network[1]) is a queueing network model where the service time for each job at each service node is given by the response time of a queueing network (and those service times in turn may also be determined by further nested networks). Resources can be nested and queues form along the nodes of the nesting structure.[2][3] The nesting structure thus defines "layers" within the queueing model.[2]
Layered queueing has applications in a wide range of distributed systems which involve different master/slave, replicated services and client-server components, allowing each local node to be represented by a specific queue, then orchestrating the evaluation of these queues.[2]
For large population of jobs, a fluid limit has been shown in PEPA to be a give good approximation of performance measures.[4]
External links
- Tutorial Introduction to Layered Modeling of Software Performance by Murray Woodside, Carleton University
References
- ^ Neilson, J. E.; Woodside, C. M.; Petriu, D. C.; Majumdar, S. (1995). "Software bottlenecking in client-server systems and rendezvous networks". IEEE Transactions on Software Engineering. 21 (9): 776. CiteSeerX 10.1.1.47.4391. doi:10.1109/32.464543.
- ^ a b c Franks, G.; Al-Omari, T.; Woodside, M.; Das, O.; Derisavi, S. (2009). "Enhanced Modeling and Solution of Layered Queueing Networks". IEEE Transactions on Software Engineering. 35 (2): 148. doi:10.1109/TSE.2008.74. S2CID 15125984.
- ^ Tribastone, M.; Mayer, P.; Wirsing, M. (2010). "Performance Prediction of Service-Oriented Systems with Layered Queueing Networks" (PDF). Leveraging Applications of Formal Methods, Verification, and Validation. LNCS. Vol. 6416. p. 51. doi:10.1007/978-3-642-16561-0_12. ISBN 978-3-642-16560-3.
- ^ Tribastone, M. (2013). "A Fluid Model for Layered Queueing Networks" (PDF). IEEE Transactions on Software Engineering. 39 (6): 744–756. doi:10.1109/TSE.2012.66. S2CID 14754101. Archived from the original (PDF) on 2016-03-03. Retrieved 2015-09-04.
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- D/M/1 queue
- M/D/1 queue
- M/D/c queue
- M/M/1 queue
- Burke's theorem
- M/M/c queue
- M/M/∞ queue
- M/G/1 queue
- M/G/k queue
- G/M/1 queue
- G/G/1 queue
- Fork–join queue
- Bulk queue
- Fluid queue
- Layered queueing network
- Polling system
- Adversarial queueing network
- Loss network
- Retrial queue
- Data buffer
- Erlang (unit)
- Erlang distribution
- Flow control (data)
- Message queue
- Network congestion
- Network scheduler
- Pipeline (software)
- Quality of service
- Scheduling (computing)
- Teletraffic engineering
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