The fractional Poisson process (FPP) is a counting process with independent and identically distributed inter-event times following the Mittag-Leffler distribution. This process is very useful in several fields of applied and theoretical physics including models for anomalous diffusion. Contrary to the well-known Poisson process, the fractional Poisson process does not have stationary and independent increments. It is not a L\'evy process and it is not a Markov process. In this letter, we present formulae for its finite-dimensional distribution functions, fully characterizing the process. These exact analytical results are compared to Monte Carlo simulations
We consider a fractional counting process with jumps of amplitude $1,2,\ldots,k$, with $k\in \math...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
We present some correlated fractional counting processes on a finite-time interval. This will be do...
The fractional Poisson process (FPP) is a counting process with independent and identically distribu...
We introduce a non-homogeneous fractional Poisson process by replacing the time variable in the frac...
The fractional nonhomogeneous Poisson process was introduced by a time change of the nonhomogeneous ...
It is our intention to provide via fractional calculus a generalization of the pure and compound...
This chapter is an attempt to present a mathematical theory of compound fractional Poisson processes...
This work concerns the fractional Poisson process and its properties. The aim of this work is to der...
We consider some fractional extensions of the recursive differential equation governing the Poisson ...
In this article, the first hitting times of generalized Poisson processes Nf(t), related to Bernštei...
AbstractTo offer an insight into the rapidly developing theory of fractional diffusion processes, we...
article in press: T.M. Michelitsch and A.P. Riascos, Continuous time random walk and diffusion with ...
We present three different fractional versions of the Poisson process and some related results conce...
We generate the fractional Poisson process by subordinating the standard Poisson process to the inve...
We consider a fractional counting process with jumps of amplitude $1,2,\ldots,k$, with $k\in \math...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
We present some correlated fractional counting processes on a finite-time interval. This will be do...
The fractional Poisson process (FPP) is a counting process with independent and identically distribu...
We introduce a non-homogeneous fractional Poisson process by replacing the time variable in the frac...
The fractional nonhomogeneous Poisson process was introduced by a time change of the nonhomogeneous ...
It is our intention to provide via fractional calculus a generalization of the pure and compound...
This chapter is an attempt to present a mathematical theory of compound fractional Poisson processes...
This work concerns the fractional Poisson process and its properties. The aim of this work is to der...
We consider some fractional extensions of the recursive differential equation governing the Poisson ...
In this article, the first hitting times of generalized Poisson processes Nf(t), related to Bernštei...
AbstractTo offer an insight into the rapidly developing theory of fractional diffusion processes, we...
article in press: T.M. Michelitsch and A.P. Riascos, Continuous time random walk and diffusion with ...
We present three different fractional versions of the Poisson process and some related results conce...
We generate the fractional Poisson process by subordinating the standard Poisson process to the inve...
We consider a fractional counting process with jumps of amplitude $1,2,\ldots,k$, with $k\in \math...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
We present some correlated fractional counting processes on a finite-time interval. This will be do...