We consider some fractional extensions of the recursive differential equation governing the Poisson process, d/dt p(k)(t) = -lambda(p(k)(t) - p(k-1)(t)), k >= 0, t > 0 by introducing fractional time-derivatives of order v, 2v,..., nv. We show that the so-called "Generalized Mittag-Leffler functions" E(alpha,beta)(k)(x), x is an element of R (introduced by Prabhakar [24]) arise as solutions of these equations. The corresponding processes are proved to be renewal, with density of the intearrival times (represented by Mittag-Leffler functions) possessing power, instead of exponential, decay, for t -> infinity. On the other hand, near the origin the behavior of the law of the interarrival times drastically changes for the parameter v varying in...
The space-fractional Poisson process is a time-changed homogeneous Poisson process where the time ch...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
In this paper, we introduce and study fractional versions of the Bell–Touchard process, the Poisson-...
We consider some fractional extensions of the recursive differential equation governing the Poisson ...
processes governed by fractional and higher-order recursive differential equations L.Beghin ∗ E.Orsi...
We propose a generalization of the alternating Poisson process from the point of view of fractional ...
It is our intention to provide via fractional calculus a generalization of the pure and compound...
We consider a fractional counting process with jumps of amplitude $1,2,\ldots,k$, with $k\in \math...
Abstract We review a variety of fractional evolution processes (so defined being governed by equat...
We analyze here different types of fractional differential equations, under the assumption that thei...
AbstractWe consider a wide class of integral and ordinary differential equations of fractional multi...
The space-fractional and the time-fractional Poisson processes are two well-known models of fraction...
We study here different fractional versions of the compound Poisson process. The fractionality is in...
We study here different fractional versions of the compound Poisson process. The fractionality is in...
In this article, the first hitting times of generalized Poisson processes Nf(t), related to Bernštei...
The space-fractional Poisson process is a time-changed homogeneous Poisson process where the time ch...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
In this paper, we introduce and study fractional versions of the Bell–Touchard process, the Poisson-...
We consider some fractional extensions of the recursive differential equation governing the Poisson ...
processes governed by fractional and higher-order recursive differential equations L.Beghin ∗ E.Orsi...
We propose a generalization of the alternating Poisson process from the point of view of fractional ...
It is our intention to provide via fractional calculus a generalization of the pure and compound...
We consider a fractional counting process with jumps of amplitude $1,2,\ldots,k$, with $k\in \math...
Abstract We review a variety of fractional evolution processes (so defined being governed by equat...
We analyze here different types of fractional differential equations, under the assumption that thei...
AbstractWe consider a wide class of integral and ordinary differential equations of fractional multi...
The space-fractional and the time-fractional Poisson processes are two well-known models of fraction...
We study here different fractional versions of the compound Poisson process. The fractionality is in...
We study here different fractional versions of the compound Poisson process. The fractionality is in...
In this article, the first hitting times of generalized Poisson processes Nf(t), related to Bernštei...
The space-fractional Poisson process is a time-changed homogeneous Poisson process where the time ch...
We consider the renewal counting number process N = N(t) as a forward march over the non-negative in...
In this paper, we introduce and study fractional versions of the Bell–Touchard process, the Poisson-...