© 2020 The Author(s). We consider a multihop switched network operating under a max-weight scheduling policy and show that the distance between the queue length process and a fluid solution remains bounded by a constant multiple of the deviation of the cumulative arrival process from its average. We then exploit this result to prove matching upper and lower bounds for the time scale over which additive state space collapse (SSC) takes place. This implies, as two special cases, an additive SSC result in diffusion scaling under nonMarkovian arrivals and, for the case of independent and identically distributed arrivals, an additive SSC result over an exponential time scale
We consider a class of stochastic processing networks. Assume that the networks satisfy a complete r...
We study the performance of Discriminatory Processor Sharing (DPS) systems, with exponential service...
We consider a processor sharing queue where the number of jobs served at any time is limited to K, w...
We consider a queueing network in which there are constraints on which queues may be served simultan...
Switched queueing networks model wireless networks, input queued switches and numerous other network...
We consider a class of queueing systems that consist of server pools in parallel and multiple custom...
We consider a stochastic network with mobile users in a heavy traffic regime. We derive the scaling ...
This paper is concerned with strong approximation in queueing networks. A model of a circuit-switche...
Consider a switched queueing network with general routing among its queues. TShe MaxWeight policy as...
We consider a switched network, a fairly general constrained queueing network model that has been u...
This paper studies the heavy-traffic joint distribution of queue lengths in two stochastic processin...
Abstract We consider a stochastic network with mobile users in a heavy traffic regime. We derive the...
We consider an input queued switch operating under the MaxWeight scheduling algorithm. This system i...
We consider a switched (queuing) network in which there are constraints on which queues may be serve...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We consider a class of stochastic processing networks. Assume that the networks satisfy a complete r...
We study the performance of Discriminatory Processor Sharing (DPS) systems, with exponential service...
We consider a processor sharing queue where the number of jobs served at any time is limited to K, w...
We consider a queueing network in which there are constraints on which queues may be served simultan...
Switched queueing networks model wireless networks, input queued switches and numerous other network...
We consider a class of queueing systems that consist of server pools in parallel and multiple custom...
We consider a stochastic network with mobile users in a heavy traffic regime. We derive the scaling ...
This paper is concerned with strong approximation in queueing networks. A model of a circuit-switche...
Consider a switched queueing network with general routing among its queues. TShe MaxWeight policy as...
We consider a switched network, a fairly general constrained queueing network model that has been u...
This paper studies the heavy-traffic joint distribution of queue lengths in two stochastic processin...
Abstract We consider a stochastic network with mobile users in a heavy traffic regime. We derive the...
We consider an input queued switch operating under the MaxWeight scheduling algorithm. This system i...
We consider a switched (queuing) network in which there are constraints on which queues may be serve...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We consider a class of stochastic processing networks. Assume that the networks satisfy a complete r...
We study the performance of Discriminatory Processor Sharing (DPS) systems, with exponential service...
We consider a processor sharing queue where the number of jobs served at any time is limited to K, w...