We discuss some of the mathematical properties of the fractional derivative defined by means of Fourier transforms. We first consider its action on the set of test functions i(R), and then we extend it to its dual set, i'(R), the set of tempered distributions, provided they satisfy some mild conditions. We discuss some examples, and we show how our definition can be used in a quantum mechanical context
We investigate and compare different representations of the Riesz derivative, which plays an importa...
In this paper, the classical problem of the probabilistic characterization of a random variable is r...
This book contains mathematical preliminaries in which basic definitions of fractional derivatives a...
We discuss some of the mathematical properties of the fractional derivative defined by means of Four...
In recent years, there has been an enormous effort put in the definition and analysis of fractional ...
In recent years, there has been an enormous effort put in the definition and analysis of fractional ...
This paper demonstrates the power of the functional-calculus definition of linear fractional (pseudo...
A distributional theory of fractional transformations is developed. A constructive approach, based o...
The Fractional Fourier transform (FrFT), as a generalization of the classical Fourier Transform, was...
The prime aim of the present paper is to continue developing the theory of tempered fractional integ...
AbstractFor 0 < α < 2, an integrated fractional Fourier transform Fα of Wiener type, closely related...
Fractional derivatives and integrals are convolutions with a power law. Including an exponential ter...
We define an infinite class of unitary transformations between configuration and momentum fractional...
The fractional calculus has been receiving considerable interest in recent decades, mainly due to it...
on the occasion of his 60th anniversary In the paper, a new definition of the fractional Fourier tra...
We investigate and compare different representations of the Riesz derivative, which plays an importa...
In this paper, the classical problem of the probabilistic characterization of a random variable is r...
This book contains mathematical preliminaries in which basic definitions of fractional derivatives a...
We discuss some of the mathematical properties of the fractional derivative defined by means of Four...
In recent years, there has been an enormous effort put in the definition and analysis of fractional ...
In recent years, there has been an enormous effort put in the definition and analysis of fractional ...
This paper demonstrates the power of the functional-calculus definition of linear fractional (pseudo...
A distributional theory of fractional transformations is developed. A constructive approach, based o...
The Fractional Fourier transform (FrFT), as a generalization of the classical Fourier Transform, was...
The prime aim of the present paper is to continue developing the theory of tempered fractional integ...
AbstractFor 0 < α < 2, an integrated fractional Fourier transform Fα of Wiener type, closely related...
Fractional derivatives and integrals are convolutions with a power law. Including an exponential ter...
We define an infinite class of unitary transformations between configuration and momentum fractional...
The fractional calculus has been receiving considerable interest in recent decades, mainly due to it...
on the occasion of his 60th anniversary In the paper, a new definition of the fractional Fourier tra...
We investigate and compare different representations of the Riesz derivative, which plays an importa...
In this paper, the classical problem of the probabilistic characterization of a random variable is r...
This book contains mathematical preliminaries in which basic definitions of fractional derivatives a...