The Mean Number-in-System Vector Range for Multiclass Queueing Networks
Published Online:1 Feb 2004https://doi.org/10.1287/moor.1030.0067
References
- On positive Harris recurrence for multiclass queueing networks: A unified approach via fluid limit models. Ann. Appl. Probab. (1995) 5:49–77Crossref, Google Scholar
- A short course in solving equations with PL homotopies. SIAM-AMS Proc. (1976) IX:73–143Google Scholar
- A Course in Triangulations for Solving Equations with Deformations (1984) (Springer Verlag, New York) Lecture Notes in Economics and Mathematical Systems, No. 234Crossref, Google Scholar
- A class of “onto” multifunctions. Math. Programming (1993) 61:327–343Crossref, Google Scholar
- Formulation of linear problems and solution by a universal machine. Math. Programming (1994) 65:263–310Crossref, Google Scholar
- Likelihood ratio gradient estimation for stochastic recursions. Adv. Appl. Probab. (1995) 27:1019–1053Crossref, Google Scholar
- Regenerative steady-state simulation of discrete-event systems. ACM Trans. Model. Comput. Simulation (2001) 11:313–345Crossref, Google Scholar
- Reversibility and Stochastic Networks (1979) (John Wiley and Sons, New York) Google Scholar
- Duality and linear programs for stability and performance analysis of queueing networks and scheduling policies. IEEE Trans. Automatic Control (1996) 41:4–17Crossref, Google Scholar
- An approximation procedure for general closed multiclass queueing networks with deterministic routing. (1992) . Ph.D. dissertation, Department of Operations Research, Stanford University, Stanford, CAGoogle Scholar
- Markov Chains and Stochastic Stability (1993) (Springer Verlag, New York) Crossref, Google Scholar
- The stability of open queueing networks. Stochastic Processes Their Appl. (1990) 35:11–25Crossref, Google Scholar
- An Introduction to Queueing Networks (1988) (Prentice Hall, Englewood Cliffs, NJ) Google Scholar
