Abstract Fujimoto et al., have proved that the tail of the joint queue length distribution in a two-stage tandem queueing system has the geometric decay property. We continue to investigate the properties of stationary distributions in this tandem queueing system. Under the same conditions proposed by them, i
AbstractWe consider an M/M/m retrial queue and investigate the tail asymptotics for the joint distri...
We consider a model consisting of two fluid queues driven by the same background continuous-time Mar...
Abstract: We consider continuous-time Markov chains representing queueing systems in random environm...
Abstract This paper is concerned with geometric decay properties of the joint queue length distribut...
extensive numerical experiment and see two types of geometric decay for the tail of the joint queue-...
For a two-stage tandem network of PHPH queues, Fujimoto and Takahashi observed that the steady-state...
Abstract We study a geometric decay property for two-node queueing networks, not restricted to ones ...
We consider a series of queues with Poisson input. Each queueing system contains an infinite number ...
In this paper, we study queueing systems with an infinite and finite number of waiting places that c...
The paper revisits the problem of the computation of the joint stationary probability distribution p...
AbstractWe consider a series of queues with Poisson input. Each queueing system contains an infinite...
A two node tandem queueing system with phase-type servers and Bernoulli arrivals is considered in di...
Quasi-birth-and-death (QBD) processes with infinite “phase spaces" can exhibit unusual and interesti...
Abstract Asymptotic decay rates are considered for the stationary joint distributions of customer po...
We consider a network of K queues in tandem labeled Q1, Q2, ..,QK. The arrivals to Q 1 form a non-h...
AbstractWe consider an M/M/m retrial queue and investigate the tail asymptotics for the joint distri...
We consider a model consisting of two fluid queues driven by the same background continuous-time Mar...
Abstract: We consider continuous-time Markov chains representing queueing systems in random environm...
Abstract This paper is concerned with geometric decay properties of the joint queue length distribut...
extensive numerical experiment and see two types of geometric decay for the tail of the joint queue-...
For a two-stage tandem network of PHPH queues, Fujimoto and Takahashi observed that the steady-state...
Abstract We study a geometric decay property for two-node queueing networks, not restricted to ones ...
We consider a series of queues with Poisson input. Each queueing system contains an infinite number ...
In this paper, we study queueing systems with an infinite and finite number of waiting places that c...
The paper revisits the problem of the computation of the joint stationary probability distribution p...
AbstractWe consider a series of queues with Poisson input. Each queueing system contains an infinite...
A two node tandem queueing system with phase-type servers and Bernoulli arrivals is considered in di...
Quasi-birth-and-death (QBD) processes with infinite “phase spaces" can exhibit unusual and interesti...
Abstract Asymptotic decay rates are considered for the stationary joint distributions of customer po...
We consider a network of K queues in tandem labeled Q1, Q2, ..,QK. The arrivals to Q 1 form a non-h...
AbstractWe consider an M/M/m retrial queue and investigate the tail asymptotics for the joint distri...
We consider a model consisting of two fluid queues driven by the same background continuous-time Mar...
Abstract: We consider continuous-time Markov chains representing queueing systems in random environm...