Add to ORKGhtmlabstractConsider the single-server queue in which customers are rejected if their total sojourn time would exceed a certain level K. A basic performance measure of this system is the probability PK that a customer gets rejected in steady state. This paper presents asymptotic expansions for PK as K ... If the service time B is light-tailed and interarrival times are exponential, it is shown that the loss probability has an exponential tail. The proof of this result heavily relies on results on the two-sided exit problem for Levy processes with no positive jumps. For heavy-tailed (subexponential) service times and generally distributed inter-arrival times, the loss probability is shown to be asymptotically equivalent to the trivial l...
This paper is concerned with computing large-deviation asymptotics for the loss process in a stylize...
Consider a uid queue with a nite buer B and capacity c fed by a superposition of N independent On-O...
We study G/G/n+GI queues in which customer patience times are independent, identically distributed f...
Consider the single-server queue in which customers are rejected if their total sojourn time would e...
AbstractThis paper studies a multiple-server queueing model under the assumptions of renewal arrival...
The main result in this paper is the characterization of the asymptotic behavior of the loss probabi...
This thesis consists of five papers (A-E). In Paper A, we study transient properties of the queue le...
We consider the stationary loss rate l(K) of a GI/G/1 queue with finite buffer of size K. Let X-n = ...
Abstract: The paper studies asymptotic behavior of the loss probability for the GI/M/m/n queueing sy...
We consider the asymptotic variance of the departure counting process D(t) of the GI/G/1 queue; D(t)...
Consider a discrete time queue with i.i.d. arrivals (see the generalisation below) and a single serv...
Abstract This paper considers the tail asymptotics for a cumulative process {B(t); t ≥ 0} sampled at...
In this article we analyze the M-X/G(Y)/1/K + B bulk queue. For this model, we consider three reject...
steady state. In particular, we investigate the tail behavior of P (V> x) as x! 1 with V being th...
We consider a closed fork and join queueing network where several lines feed a single as-sembly stat...
This paper is concerned with computing large-deviation asymptotics for the loss process in a stylize...
Consider a uid queue with a nite buer B and capacity c fed by a superposition of N independent On-O...
We study G/G/n+GI queues in which customer patience times are independent, identically distributed f...
Consider the single-server queue in which customers are rejected if their total sojourn time would e...
AbstractThis paper studies a multiple-server queueing model under the assumptions of renewal arrival...
The main result in this paper is the characterization of the asymptotic behavior of the loss probabi...
This thesis consists of five papers (A-E). In Paper A, we study transient properties of the queue le...
We consider the stationary loss rate l(K) of a GI/G/1 queue with finite buffer of size K. Let X-n = ...
Abstract: The paper studies asymptotic behavior of the loss probability for the GI/M/m/n queueing sy...
We consider the asymptotic variance of the departure counting process D(t) of the GI/G/1 queue; D(t)...
Consider a discrete time queue with i.i.d. arrivals (see the generalisation below) and a single serv...
Abstract This paper considers the tail asymptotics for a cumulative process {B(t); t ≥ 0} sampled at...
In this article we analyze the M-X/G(Y)/1/K + B bulk queue. For this model, we consider three reject...
steady state. In particular, we investigate the tail behavior of P (V> x) as x! 1 with V being th...
We consider a closed fork and join queueing network where several lines feed a single as-sembly stat...
This paper is concerned with computing large-deviation asymptotics for the loss process in a stylize...
Consider a uid queue with a nite buer B and capacity c fed by a superposition of N independent On-O...
We study G/G/n+GI queues in which customer patience times are independent, identically distributed f...