In this paper, the classical problem of the probabilistic characterization of a random variable is reexamined. A random variable is usually described by the probability density function (PDF) or by its Fourier transform, namely the characteristic function (CF). The CF can be further expressed by a Taylor series involving the moments of the random variable. However, in some circumstances, the moments do not exist and the Taylor expansion of the CF is useless. This happens for example in the case of α-stable random variables. Here, the problem of representing the CF or the PDF of random variables (r.vs) is examined by introducing fractional calculus. Two very remarkable results are obtained. Firstly, it is shown that the fractional derivat...
Abstract: In this paper some issues of application of Riemann — Liouville operators to the...
The theory of Fourier transforms of generalized functions is used to extract general formulas for th...
In this paper, a generalized notion of wide-sense \u3b1-stationarity for random signals is presented...
In this paper, the classical problem of the probabilistic characterization of a random variable is r...
The aim of this paper is the probabilistic representation of the probability density function (PDF) ...
Fractional moments have been investigated by many authors to represent the density of univariate and...
The aim of this thesis is to formulate issues regarding fractional mo- ments of random variables. Fr...
The theory of fractional calculus (FC) is a useful mathematical tool for applied sciences. Neverthe...
In order to develop certain fractional probabilistic analogues of Taylor’s theorem and mean value th...
The statistical meaning of higher ΔN (p) (p = 1, 2, ...) and fractional ΔN (p) (0 < p < ∞) moments f...
Characteristic Functions (cf) have been used to establish the convergence of several independent and...
Includes bibliographical references.This paper is concerned with a particularly useful function of p...
AbstractThe invariance structure of self-affine functions and measures leads to the concept of fract...
We derive a probabilistic representation for the Fourier symbols of the generators of some stable pr...
The theory of fractional calculus (FC) is a useful mathematical tool in many applied sciences. Never...
Abstract: In this paper some issues of application of Riemann — Liouville operators to the...
The theory of Fourier transforms of generalized functions is used to extract general formulas for th...
In this paper, a generalized notion of wide-sense \u3b1-stationarity for random signals is presented...
In this paper, the classical problem of the probabilistic characterization of a random variable is r...
The aim of this paper is the probabilistic representation of the probability density function (PDF) ...
Fractional moments have been investigated by many authors to represent the density of univariate and...
The aim of this thesis is to formulate issues regarding fractional mo- ments of random variables. Fr...
The theory of fractional calculus (FC) is a useful mathematical tool for applied sciences. Neverthe...
In order to develop certain fractional probabilistic analogues of Taylor’s theorem and mean value th...
The statistical meaning of higher ΔN (p) (p = 1, 2, ...) and fractional ΔN (p) (0 < p < ∞) moments f...
Characteristic Functions (cf) have been used to establish the convergence of several independent and...
Includes bibliographical references.This paper is concerned with a particularly useful function of p...
AbstractThe invariance structure of self-affine functions and measures leads to the concept of fract...
We derive a probabilistic representation for the Fourier symbols of the generators of some stable pr...
The theory of fractional calculus (FC) is a useful mathematical tool in many applied sciences. Never...
Abstract: In this paper some issues of application of Riemann — Liouville operators to the...
The theory of Fourier transforms of generalized functions is used to extract general formulas for th...
In this paper, a generalized notion of wide-sense \u3b1-stationarity for random signals is presented...