Researches on retrial queues with non-geometrical retrial times is motivated by real computers and telecommunication networks, where retrial times can hardly be geometrical distributed. The inherent difficulty with non-geometrical retrial times is caused by the fact that queueing models must keep track of the elapsed retrial time for each of possibly a very large number of customers in the orbit. This paper analyses a discrete-time Geo/G/1 retrial queue with general retrial times in which the arriving customers may opt to follow a LCFS-PR discipline or to join the orbit. The Markov chain underlying the system has been studied, the generating functions of the number of customers in the orbit and in the system as well as its expected values a...
AbstractThis paper is concerned with the analysis of a single-server queue with Bernoulli vacation s...
We consider a multi-server retrial queueing model in which customers arrive according to a Markovian...
This paper presents an overview of one-server queueing models with retrials in discrete-time. In all...
This paper analyses a discrete-time Geo/G/1 retrial queue with general retrial times in which the a...
This paper considers a discrete-time retrial queueing system with movements. The arriving customers ...
We study the Markov chain underlying the considered queueing system obtaining the gen- erating funct...
Abstract This paper studies a discrete-time Geo/G/1 retrial queue where the server is subject to sta...
AbstractWe consider a discrete-time Geo[X]/G/1 retrial queue with general retrial times. The system ...
This paper centers on a discrete-time retrial queue where the server experiences breakdowns and repa...
AbstractWe analyse a discrete-time Geo[X]/GH/1 retrial queue where each call after service either im...
AbstractWe consider a discrete-time Geo/G/1 retrial queue with starting failures in which all the ar...
In this paper, we study a multi-server queueing system with retrials and an infinite orbit. The arri...
In this article we analyze a model of a retrial queueing system where customers in the orbit join a ...
Purpose: We consider a discrete-time Geo/G/1 retrial queue where the retrial time follows a general ...
We consider a general G/G/1 retrial queue where retrials can be non Markovian. We obtain asymptotica...
AbstractThis paper is concerned with the analysis of a single-server queue with Bernoulli vacation s...
We consider a multi-server retrial queueing model in which customers arrive according to a Markovian...
This paper presents an overview of one-server queueing models with retrials in discrete-time. In all...
This paper analyses a discrete-time Geo/G/1 retrial queue with general retrial times in which the a...
This paper considers a discrete-time retrial queueing system with movements. The arriving customers ...
We study the Markov chain underlying the considered queueing system obtaining the gen- erating funct...
Abstract This paper studies a discrete-time Geo/G/1 retrial queue where the server is subject to sta...
AbstractWe consider a discrete-time Geo[X]/G/1 retrial queue with general retrial times. The system ...
This paper centers on a discrete-time retrial queue where the server experiences breakdowns and repa...
AbstractWe analyse a discrete-time Geo[X]/GH/1 retrial queue where each call after service either im...
AbstractWe consider a discrete-time Geo/G/1 retrial queue with starting failures in which all the ar...
In this paper, we study a multi-server queueing system with retrials and an infinite orbit. The arri...
In this article we analyze a model of a retrial queueing system where customers in the orbit join a ...
Purpose: We consider a discrete-time Geo/G/1 retrial queue where the retrial time follows a general ...
We consider a general G/G/1 retrial queue where retrials can be non Markovian. We obtain asymptotica...
AbstractThis paper is concerned with the analysis of a single-server queue with Bernoulli vacation s...
We consider a multi-server retrial queueing model in which customers arrive according to a Markovian...
This paper presents an overview of one-server queueing models with retrials in discrete-time. In all...