Queueing Theory 2. Nikolaos Limnios
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Georgiadis, L., Szpankowski, W. (1992). Stability of token passing rings. Queueing Systems, 11, 7–33.
Gideon, R., Pyke, R. (1999). Markov renewal modeling of Poisson traffic at intersections having separate turn lanes. In Semi-Markov Models and Applications, Janssen, J., Limneos, N. (eds). Springer, New York, NY, 285–310.
Gillent, F., Latouche, G. (1983). Semi-explicit solution for M|PH|1 – like queueing systems. European Journal of Operational Research, 13(2), 151–160.
Grandell, J. (1976). Double Stochastic Poisson Process, Lecture Notes in Mathematics, 529, Springer, Berlin.
Greenshields, B.D. (1935). A study of highway capacity. Proc. Highway Res., 14, 448–477.
Grinbeerg, H. (1959). An analysis of traffic flows. Oper. Res., 7, 79–85.
Helbing, D. (2001). Traffic and related self-driven many-particle systems. Rev. Mod. Phys., 73, 1067–1141.
Inose, H., Hamada, T. (1975). Road Traffic Control. University of Tokyo Press, Tokyo.
Kiefer, J., Wolfowitz, J. (1955). On the theory of queues with many servers. Trans. Amer. Math. Soc., 78, 1–18.
Krishnamoorthy, A., Pramod, P., Chakravarthy, S. (2012). Queues with interruptions: A survey. TOP, 1-31 doi:10.1007/s11750-012-0256-6.
Loynes, R.M. (1962). The stability of a queue with non-independent inter-arrival and service times. Proc. Cambr. Phil. Soc., 58(3), 497–520.
Maerivoet, S., de Moor, B. (2005). Cellular automata models of road traffic. Phys. Rep., 419, 1–64.
Malyshev, V.A., Menshikov, M.V. (1982). Ergodicity continuity and analyticity of countable Markov chains. Trans Moscow Math, 1, 1–48.
Meyn, S.P., Tweedie, R.L. (2009). Markov Chains and Stochastic Stability. Cambridge University Press, New York.
Morozov, E. (2004). Weak regeneration in modeling of queueing processes. Queueing Systems, 46, 295–315.
Morozov, E. (2007). A multiserver retrial queue: Regenerative stability analysis. Queueing Systems, 56(3-4), 157–168.
Morozov, E., Dimitriou, I. (2017). Stability analysis of a multiclass retrial system with coupled orbit queues. In Computer Performance Engineering. EPEW 2017, Reinecke, P., Di Marco, A. (eds). Lecture Notes in Computer Science. Springer, Cham, 85–98.
Morozov, E., Fiems, D., Bruneel, H. (2011). Stability analysis of multiserver discrete-time queueing systems with renewal-type server interruptions. Performance Evaluation, 68(12), 1261–1275.
Morozov, E., Rumyantsev, A. (2016). Stability analysis of a MAP|M|s cluster model by matrix-analytic method. European Workshop on Computer Performance Engineering, 63–76.
Neuts, M. (1989). Structured Stochastic Matrices of M/G/1 Type and Their Applications. Marcel Dekker, New York.
Pechinkin, A., Socolov, I., Chaplygin, V. (2009). Multichannel queueing system with refusals of servers groups. Informatics and Its Applications, 3(3), 4–15.
Rumyantsev, A., Morozov, E. (2017). Stability criterion of a multi-server model with simultaneous service. Annals of Operations Research, 252(1), 29–39.
Saaty, T.L. (1961). Elements of Queueing Theory with Applications. McGraw-Hill, Inc, New York, NY.
Sadowsky, J.S. (1995). The probability of large queue lengths and waiting times in a heterogeneous multiserver queue: positive recurrence and logarithmic limits. Adv. Appl. Prob., 27, 567–583.
Schadschneider A. (2000). Statistical physics of traffic flow. arXiv:arXiv:condmat/0007418 v1 [cond-mat.stat-mech].
Smith, W. (1955). Regenerative stochastic processes. Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 232(1188), 6–31.
Szpankowski, W. (1994). Stability conditions for some distributed systems. Buffered random access systems. Adv. Appl. Prob., 26, 498–515.
Thiruvengadam, K. (1963). Queueing with breakdowns. Operations Research, 11(1), 62–71.
Thorisson, H. (2000). Coupling, Stationary and Regeneration. Springer, New York.
White, H., Christie, L.S. (1958). Queueing with preemptive priorities or with breakdown. Operations Research, 6(1), 79–95.
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