Add to ORKGIn this paper the authors define a queueing model that is an M (X ) /G/1 model with an internal retrial system based on two types of search of customers from the orbit. The authors generalize the M /G/1 retrial model which has been defined by other authors in the literature. The authors assume that the process of arrivals to the system is a batch Poisson process. They also define two models: Model 1 and Model 2, based on two different search procedures for customers who are waiting in the orbit within the system. In this context the authors define the corresponding mathematical model and study the stationary distribution of the embedded Markov chain. They study the stationary distribution of system size and orbit size at arbitrary time. The...
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 ...
Researches on retrial queues with non-geometrical retrial times is motivated by real computers and t...
In this paper the authors define a queueing model that is an M (X ) /G/1 model with an internal retr...
We analyze a single-server retrial queueing system with finite buffer, Poisson arrivals, and general...
A single-server retrial queueing system with finite buffer, Poisson arrivals and arbitrary distribut...
We consider a multi-server retrial queueing model in which customers arrive according to a Markovian...
Abstract—In this paper a queueing system with a single customer searching server, retrials, finite b...
In this paper a queueing system with a single customer searching server, retrials, finite buffer, P...
This article deals with a new model for the M/G/1 retrial queue. We consider the process (M(t),N(t))...
Abstract This paper studies a discrete-time Geo/G/1 retrial queue where the server is subject to sta...
This paper considers a retrial tandem queue with single orbit, Poisson arrivals of incoming calls an...
In this work, we carry out a stochastic analysis of the M/G/1 retrial queue with batch arrivals and ...
We consider retrial queueing systems with a finite number of homogeneous sources of service requests...
In this paper a queueing system with a single customer searching server, retrials, finite buffer, P...
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 ...
Researches on retrial queues with non-geometrical retrial times is motivated by real computers and t...
In this paper the authors define a queueing model that is an M (X ) /G/1 model with an internal retr...
We analyze a single-server retrial queueing system with finite buffer, Poisson arrivals, and general...
A single-server retrial queueing system with finite buffer, Poisson arrivals and arbitrary distribut...
We consider a multi-server retrial queueing model in which customers arrive according to a Markovian...
Abstract—In this paper a queueing system with a single customer searching server, retrials, finite b...
In this paper a queueing system with a single customer searching server, retrials, finite buffer, P...
This article deals with a new model for the M/G/1 retrial queue. We consider the process (M(t),N(t))...
Abstract This paper studies a discrete-time Geo/G/1 retrial queue where the server is subject to sta...
This paper considers a retrial tandem queue with single orbit, Poisson arrivals of incoming calls an...
In this work, we carry out a stochastic analysis of the M/G/1 retrial queue with batch arrivals and ...
We consider retrial queueing systems with a finite number of homogeneous sources of service requests...
In this paper a queueing system with a single customer searching server, retrials, finite buffer, P...
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 ...
Researches on retrial queues with non-geometrical retrial times is motivated by real computers and t...