论文信息 - Rare events in series of queues

Rare events in series of queues

In an ergodic network of K MIMI/1 queues in series we consider the rare event that, as N increases, the total population in the network exceeds N during a busy period. By utilizing the contraction principle of large deviation theory, an action functional is obtained for this exit problem. The ensuing minimization is carried out for K = 2 and an indication is given for arbitrary K. It is shown that, asymptotically and for unequal service rates, the 'most likely' path for this rare event is one where the arrival rate has been interchanged with the smallest service rate. The problem has been posed in Parekh and Walrand [7] in connection with importance sampling simulation methods for queueing networks. Its solution has previously been obtained only heuristically.

P. Tsoucas

[1] A. D. Venttsel. Rough Limit Theorems on Large Deviations for Markov Stochastic Processes. IV , 1977 .

[2] R. Weber. THE INTERCHANGEABILITY OF -/M/1 QUEUES IN SERIES , 1979 .

[3] Marie Cottrell,et al. Large deviations and rare events in the study of stochastic algorithms , 1983 .

[4] Martin I. Reiman,et al. Open Queueing Networks in Heavy Traffic , 1984, Math. Oper. Res..

[5] S. Varadhan. Large Deviations and Applications , 1984 .

[6] R. D. Fresnedo. Quick simulation of rare events in networks , 1989, WSC '89.

[7] Jean Walrand,et al. A quick simulation method for excessive backlogs in networks of queues , 1989 .

[8] James A. Bucklew,et al. Large Deviation Techniques in Decision, Simulation, and Estimation , 1990 .

[9] P. Dupuis,et al. Large deviations for Markov processes with discontinuous statistics , 1991 .