We develop a methodology for studying "large deviations type" questions. Our approach does not require that the large deviations principle holds, and is thus applicable to a larg class of systems. We study a system of queues with exponential servers, which share an arrival stream. Arrivals are routed to the (weighted) shortest queue. It is not known whether the large deviations principle holds for this system. Using the tools developed here we derive large deviations type estimates for the most likely behavior, the most likely path to overflow and the probability of overflow. The analysis applies to any finite number of queues. We show via a counterexample that this sytem may exhibit unexpected behavior
Let Qλ (t, y) be the number of people present at time t with y units of remaining service time in an...
This paper considers Gaussian flows multiplexed in a queueing network. A single node being a useful ...
Let Qλ(t, y) be the number of people present at time t with at least y units of remaining service ti...
We develop a methodology for studying ''large deviations type'' questions. Our approach does not req...
We develop a methodology for studying "large deviations type" questions. Our approach does not requi...
We develop a methodology for studying “large deviations type” questions. Our approach does not requi...
. We consider large deviations results for a network of two queues in which some customers may join ...
We study sample-path large deviations for Lévy processes and random walks with heavy-tailed jump-siz...
We consider from a thermodynamic viewpoint queueing systems where the workload process is assumed to...
We prove the existence of a rate function and the validity of the large deviation principle for a ge...
The main purpose of the article is to provide a simpler and more elementary alternative derivation o...
This paper considers Gaussian flows multiplexed in a queueing network, where the underlying correlat...
In this thesis we consider prove large deviations results for two kinds of queuing systems. In the...
Includes bibliographical references (p. 39-41).Supported by a Presidential Young Investigator award....
In this paper we consider an infinite-server queue in a random environment. The distinguishing featu...
Let Qλ (t, y) be the number of people present at time t with y units of remaining service time in an...
This paper considers Gaussian flows multiplexed in a queueing network. A single node being a useful ...
Let Qλ(t, y) be the number of people present at time t with at least y units of remaining service ti...
We develop a methodology for studying ''large deviations type'' questions. Our approach does not req...
We develop a methodology for studying "large deviations type" questions. Our approach does not requi...
We develop a methodology for studying “large deviations type” questions. Our approach does not requi...
. We consider large deviations results for a network of two queues in which some customers may join ...
We study sample-path large deviations for Lévy processes and random walks with heavy-tailed jump-siz...
We consider from a thermodynamic viewpoint queueing systems where the workload process is assumed to...
We prove the existence of a rate function and the validity of the large deviation principle for a ge...
The main purpose of the article is to provide a simpler and more elementary alternative derivation o...
This paper considers Gaussian flows multiplexed in a queueing network, where the underlying correlat...
In this thesis we consider prove large deviations results for two kinds of queuing systems. In the...
Includes bibliographical references (p. 39-41).Supported by a Presidential Young Investigator award....
In this paper we consider an infinite-server queue in a random environment. The distinguishing featu...
Let Qλ (t, y) be the number of people present at time t with y units of remaining service time in an...
This paper considers Gaussian flows multiplexed in a queueing network. A single node being a useful ...
Let Qλ(t, y) be the number of people present at time t with at least y units of remaining service ti...