Add to ORKGThe concept of local fractional derivative is studied. A more straightforward def-inition is proposed and its properties are studied. This local fractional derivative is applied to stable distributions. The possibility of defining local fractional derivative based on the Weyl derivative is examined. The relationship between the resulting local fractional derivative and the Kolwankar-Gangal derivative is established.
The fractional derivative has a long history in mathematics dating back further than integer-order d...
Fractional calculus provides the possibility of introducing integrals and derivatives of an arbitrar...
n this article, we first propose a new numerical technique based upon a certain two-dimensional exten...
Here is introduced and studied the left fractional local general M-derivative of various orders. All...
AbstractWe present the necessary conditions for the existence of the Kolwankar–Gangal local fraction...
Here is introduced and studied the left fractional local general M-derivative of various orders. All...
In this short note we present a new general definition of local fractional derivative, that depends ...
In this work, we introduce a definition of a local fractional derivative and a fractional integral ...
Two approaches for defining fractional derivatives of periodic distributions are presented. The firs...
The thesis deals with applications of fractional calculus to fractals. It introduces the notion of l...
In the paper, we present a new definition of fractional derivative with a smooth kernel which takes ...
Here is introduced and studied the right fractional local general M-derivative of various orders. Al...
We develop the notion of local fractional derivative introduced by Kolvankar and Gangal. It allows a...
AbstractLocal fractional derivative (LFD) operators have been introduced in the recent literature (C...
Abstract—The aim of this paper is to study the Local Frac-tional Fourier transforms. We have proved ...
The fractional derivative has a long history in mathematics dating back further than integer-order d...
Fractional calculus provides the possibility of introducing integrals and derivatives of an arbitrar...
n this article, we first propose a new numerical technique based upon a certain two-dimensional exten...
Here is introduced and studied the left fractional local general M-derivative of various orders. All...
AbstractWe present the necessary conditions for the existence of the Kolwankar–Gangal local fraction...
Here is introduced and studied the left fractional local general M-derivative of various orders. All...
In this short note we present a new general definition of local fractional derivative, that depends ...
In this work, we introduce a definition of a local fractional derivative and a fractional integral ...
Two approaches for defining fractional derivatives of periodic distributions are presented. The firs...
The thesis deals with applications of fractional calculus to fractals. It introduces the notion of l...
In the paper, we present a new definition of fractional derivative with a smooth kernel which takes ...
Here is introduced and studied the right fractional local general M-derivative of various orders. Al...
We develop the notion of local fractional derivative introduced by Kolvankar and Gangal. It allows a...
AbstractLocal fractional derivative (LFD) operators have been introduced in the recent literature (C...
Abstract—The aim of this paper is to study the Local Frac-tional Fourier transforms. We have proved ...
The fractional derivative has a long history in mathematics dating back further than integer-order d...
Fractional calculus provides the possibility of introducing integrals and derivatives of an arbitrar...
n this article, we first propose a new numerical technique based upon a certain two-dimensional exten...