The authors consider further generalization of the queuing systems, in which customers require not only a server but also a certain amount of limited resources. In the considered queuing system, arrival and serving intensities depend on the statе of the system. The authors assume an arbitrary distribution of the service time. The authors prove that the stationary distribution of the system has product form in the case of Poisson arrivals. Moreover, it was shown that the steady-state probability distribution of number of customers in the system and volumes of occupied resources depends on the service time distribution only through its mean. © 2018 Federal Research Center Computer Science and Control of Russian Academy of Sciences
We investigate multi-server queueing systems with Poisson arrivals, non-identical servers and custom...
Consideration is given to the stationary characteristics of single-server queues with the queue of i...
Summary (translated from the Russian): "We consider a queueing system of GI/GI/1/r type with group a...
Abstract The stationary distribution of the number of customers in the infinite-server system with n...
We consider a model of a multi-server queueing system with losses caused by lack of resources necess...
The queueing system GI/GI/1/r with batch arrival, input and service-lime distribution functions of p...
In this work, a simplification approach for analysis of queueing systems with random requirements is...
In this paper, we consider various queueing models in which the server can work at two different ser...
Customers arriving randomly are served by a queueing system consisting of a sequence of two service ...
Consideration is given to queueing system with Poisson flows of ordinary and negative customers. O...
We investigate the transient and stationary queue length distributions of a class of service systems...
This paper analyzes a single-server discrete-time queueing model with general independent arrivals, ...
In this paper, we consider various queueing models in which the server can work at two different ser...
The article gives an overview of resource queuing systems with the concentration on the methods of t...
In the paper, we investigate a single-server queueing system with unlimited memory space and non-hom...
We investigate multi-server queueing systems with Poisson arrivals, non-identical servers and custom...
Consideration is given to the stationary characteristics of single-server queues with the queue of i...
Summary (translated from the Russian): "We consider a queueing system of GI/GI/1/r type with group a...
Abstract The stationary distribution of the number of customers in the infinite-server system with n...
We consider a model of a multi-server queueing system with losses caused by lack of resources necess...
The queueing system GI/GI/1/r with batch arrival, input and service-lime distribution functions of p...
In this work, a simplification approach for analysis of queueing systems with random requirements is...
In this paper, we consider various queueing models in which the server can work at two different ser...
Customers arriving randomly are served by a queueing system consisting of a sequence of two service ...
Consideration is given to queueing system with Poisson flows of ordinary and negative customers. O...
We investigate the transient and stationary queue length distributions of a class of service systems...
This paper analyzes a single-server discrete-time queueing model with general independent arrivals, ...
In this paper, we consider various queueing models in which the server can work at two different ser...
The article gives an overview of resource queuing systems with the concentration on the methods of t...
In the paper, we investigate a single-server queueing system with unlimited memory space and non-hom...
We investigate multi-server queueing systems with Poisson arrivals, non-identical servers and custom...
Consideration is given to the stationary characteristics of single-server queues with the queue of i...
Summary (translated from the Russian): "We consider a queueing system of GI/GI/1/r type with group a...