Several queueing systems in heavy traffic regimes are shown to admit a diffusive approximation in terms of the Reflected Brownian Motion. The latter is defined by solving the Skorokhod reflection problem on the trajectories of a standard Brownian motion. In recent years, fractional queueing systems have been introduced to model a class of queueing systems with heavy-tailed interarrival and service times. In this paper, we consider a subdiffusive approximation for such processes in the heavy traffic regime. To do this, we introduce the Delayed Reflected Brownian Motion by either solving the Skorohod reflection problem on the trajectories of the delayed Brownian motion or by composing the Reflected Brownian Motion with an inverse stable subor...
Applications arising from computer, telecommunications, and manufacturing systems lead to many chall...
Let $\mathbb{X}=(\mathbb{X}_t)_{t\geq 0}$ be the subdiffusive process defined, for any $t\geq 0$, by...
We consider the ¿(i)/GI/1 queue, in which the arrival times of a fixed population of n customers are...
Several queueing systems in heavy traffic regimes are shown to admit a diffusive approximation in te...
Continuous time random walks (CTRWs) have random waiting times between particle jumps. We establish ...
This paper shows that fractional Brownian motion with H < 1=2 can arise as a limit of a simple cl...
Recently, heavy-traffic theory has been applied for understanding behavior of delay in switches. The...
We analyze the way in which large queues build up in the single-server fractional Brownian motion qu...
AbstractWe consider a family of non-deterministic fluid models that can be approximated under heavy ...
We consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin–Whitt regime...
We consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin-Whitt regime...
Abstract. A Brownian time process is a Markov process subordinated to the absolute value of an indep...
We consider a stochastic fluid queue served by a constant rate server and driven by a process which ...
We introduce a fractional generalization of the Erlang Queues M∕Ek∕1 . Such process is obtained thro...
Applications arising from computer, telecommunications, and manufacturing systems lead to many chall...
Let $\mathbb{X}=(\mathbb{X}_t)_{t\geq 0}$ be the subdiffusive process defined, for any $t\geq 0$, by...
We consider the ¿(i)/GI/1 queue, in which the arrival times of a fixed population of n customers are...
Several queueing systems in heavy traffic regimes are shown to admit a diffusive approximation in te...
Continuous time random walks (CTRWs) have random waiting times between particle jumps. We establish ...
This paper shows that fractional Brownian motion with H < 1=2 can arise as a limit of a simple cl...
Recently, heavy-traffic theory has been applied for understanding behavior of delay in switches. The...
We analyze the way in which large queues build up in the single-server fractional Brownian motion qu...
AbstractWe consider a family of non-deterministic fluid models that can be approximated under heavy ...
We consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin–Whitt regime...
We consider the heavy-traffic approximation to the GI/M/s queueing system in the Halfin-Whitt regime...
Abstract. A Brownian time process is a Markov process subordinated to the absolute value of an indep...
We consider a stochastic fluid queue served by a constant rate server and driven by a process which ...
We introduce a fractional generalization of the Erlang Queues M∕Ek∕1 . Such process is obtained thro...
Applications arising from computer, telecommunications, and manufacturing systems lead to many chall...
Let $\mathbb{X}=(\mathbb{X}_t)_{t\geq 0}$ be the subdiffusive process defined, for any $t\geq 0$, by...
We consider the ¿(i)/GI/1 queue, in which the arrival times of a fixed population of n customers are...