Abstract We study a geometric decay property for two-node queueing networks, not restricted to ones having acyclic configuration. We take a matrix-analytic approach, and prove the geometric decay property of the marginal queue-length distributions by giving an upper bound of the exact decay rate for each node. The upper bound coincides with the exact decay rate for Jackson networks and MAP/M/1→/M/1 tandem queues
We consider two parallel queues, each with independent Poisson arrival rates, that are tended by a s...
Abstract—We look at irreducible continuous time Markov chains with a finite or countably infinite nu...
For a two-stage tandem network of PHPH queues, Fujimoto and Takahashi observed that the steady-state...
Abstract Fujimoto et al., have proved that the tail of the joint queue length distribution in a two-...
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-...
Abstract Asymptotic decay rates are considered for the stationary joint distributions of customer po...
We consider two variants of a two-station tandem network with blocking. In both variants the first s...
We consider two variants of a two-station tandem network with blocking. In both variants the first s...
We study one-dimensional continuous loss networks with length distribution G and cable capacity C. W...
We study one-dimensional continuous loss networks with length distribution G and cable capacity C. W...
Quasi-birth-and-death (QBD) processes with infinite “phase spaces" can exhibit unusual and interesti...
We consider an extension of the classical machine-repair model, where we assume that the machines, a...
We study a network of parallel single-server queues, where the speeds of the servers are varying ove...
One of the key performance measures in queueing systems is the exponential decay rate of the steady-...
We consider two parallel queues, each with independent Poisson arrival rates, that are tended by a s...
Abstract—We look at irreducible continuous time Markov chains with a finite or countably infinite nu...
For a two-stage tandem network of PHPH queues, Fujimoto and Takahashi observed that the steady-state...
Abstract Fujimoto et al., have proved that the tail of the joint queue length distribution in a two-...
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-...
Abstract Asymptotic decay rates are considered for the stationary joint distributions of customer po...
We consider two variants of a two-station tandem network with blocking. In both variants the first s...
We consider two variants of a two-station tandem network with blocking. In both variants the first s...
We study one-dimensional continuous loss networks with length distribution G and cable capacity C. W...
We study one-dimensional continuous loss networks with length distribution G and cable capacity C. W...
Quasi-birth-and-death (QBD) processes with infinite “phase spaces" can exhibit unusual and interesti...
We consider an extension of the classical machine-repair model, where we assume that the machines, a...
We study a network of parallel single-server queues, where the speeds of the servers are varying ove...
One of the key performance measures in queueing systems is the exponential decay rate of the steady-...
We consider two parallel queues, each with independent Poisson arrival rates, that are tended by a s...
Abstract—We look at irreducible continuous time Markov chains with a finite or countably infinite nu...
For a two-stage tandem network of PHPH queues, Fujimoto and Takahashi observed that the steady-state...