We introduce a fractional generalization of the Erlang Queues M∕Ek∕1 . Such process is obtained through a time-change via inverse stable subordinator of the classical queue process. We first exploit the (fractional) Kolmogorov forward equation for such process, then we use such equation to obtain an interpretation of this process in the queuing theory context. Then we also exploit the transient state probabilities and some features of this fractional queue model, such as the mean queue length, the distribution of the busy periods and some conditional distributions of the waiting times. Finally, we provide some algorithms to simulate their sample paths. M∕Ek∕1 . Such process is obtained through a time-change via inverse stable subordinator o...
We introduce a non-homogeneous fractional Poisson process by replacing the time variable in the frac...
It is our intention to provide via fractional calculus a generalization of the pure and compound...
It is well-known that compositions of Markov processes with inverse subordinators are governed by in...
We introduce a fractional generalization of the Erlang Queues M∕Ek∕1 . Such process is obtained thro...
Starting from the definition of fractional M/M/1 queue given in the reference by Cahoy et al. in 201...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
We propose a generalization of the classical M/M/1 queue process. The resulting model is derived by ...
Starting from the definition of fractional M/M/1 queue given in the reference by Cahoy et al. in 201...
We study some features of the transient probability distribution of a fractional M/ M/ ∞ queueing sy...
Several queueing systems in heavy traffic regimes are shown to admit a diffusive approximation in te...
We generate the fractional Poisson process by subordinating the standard Poisson process to the inve...
We consider the Erlang A model, or M/M/m+M queue, with Poisson arrivals, exponential service times, ...
AbstractThe Ehrenfest model is considered as a good example of a Markov chain. I prove in this paper...
In this thesis, the Erlang queueing model Af/i/l, where customers arrive at random mean rate A and s...
We introduce a non-homogeneous fractional Poisson process by replacing the time variable in the frac...
It is our intention to provide via fractional calculus a generalization of the pure and compound...
It is well-known that compositions of Markov processes with inverse subordinators are governed by in...
We introduce a fractional generalization of the Erlang Queues M∕Ek∕1 . Such process is obtained thro...
Starting from the definition of fractional M/M/1 queue given in the reference by Cahoy et al. in 201...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
We propose a generalization of the classical M/M/1 queue process. The resulting model is derived by ...
Starting from the definition of fractional M/M/1 queue given in the reference by Cahoy et al. in 201...
We study some features of the transient probability distribution of a fractional M/ M/ ∞ queueing sy...
Several queueing systems in heavy traffic regimes are shown to admit a diffusive approximation in te...
We generate the fractional Poisson process by subordinating the standard Poisson process to the inve...
We consider the Erlang A model, or M/M/m+M queue, with Poisson arrivals, exponential service times, ...
AbstractThe Ehrenfest model is considered as a good example of a Markov chain. I prove in this paper...
In this thesis, the Erlang queueing model Af/i/l, where customers arrive at random mean rate A and s...
We introduce a non-homogeneous fractional Poisson process by replacing the time variable in the frac...
It is our intention to provide via fractional calculus a generalization of the pure and compound...
It is well-known that compositions of Markov processes with inverse subordinators are governed by in...