AbstractWe develop the notion of local fractional derivative introduced by Kolvankar and Gangal. It allows a fine study of the local structure of irregular (fractal) functions. Using this tool, we extend classical theorems of analysis (extrema, Rolle) to non-differentiable functions. In particular, we prove a generalized Taylor expansion theorem. We introduce a new derivative of real order and discuss its properties
AbstractIn the present article, a set of new difference sequence spaces of fractional order has been...
Riemann’s non-differentiable function is a classic example of a continuous function which is almost ...
AbstractThe method of characteristics has played a very important role in mathematical physics. Prev...
We develop the notion of local fractional derivative introduced by Kolvankar and Gangal. It allows a...
AbstractThe modified Riemann–Liouville fractional derivative applies to functions which are fraction...
AbstractLocal fractional derivative (LFD) operators have been introduced in the recent literature (C...
Fractional and fractal derivatives are both generalizations of the usual derivatives that consider d...
This paper is devoted to the study of existence and uniqueness of solutions for fractional function...
In this short note we present a new general definition of local fractional derivative, that depends ...
A question of classical mathematical analysis- the existence of a contin-uous non-differentiable fun...
AbstractWe propose a (new) definition of a fractional Laplace’s transform, or Laplace’s transform of...
AbstractWe present the necessary conditions for the existence of the Kolwankar–Gangal local fraction...
International audienceWe study a notion of local fractional differentiation, obtained by localizing ...
In this work, we introduce a definition of a local fractional derivative and a fractional integral ...
In this manuscript we introduced the generalized fractional Riemann-Liouville and Caputo like deriva...
AbstractIn the present article, a set of new difference sequence spaces of fractional order has been...
Riemann’s non-differentiable function is a classic example of a continuous function which is almost ...
AbstractThe method of characteristics has played a very important role in mathematical physics. Prev...
We develop the notion of local fractional derivative introduced by Kolvankar and Gangal. It allows a...
AbstractThe modified Riemann–Liouville fractional derivative applies to functions which are fraction...
AbstractLocal fractional derivative (LFD) operators have been introduced in the recent literature (C...
Fractional and fractal derivatives are both generalizations of the usual derivatives that consider d...
This paper is devoted to the study of existence and uniqueness of solutions for fractional function...
In this short note we present a new general definition of local fractional derivative, that depends ...
A question of classical mathematical analysis- the existence of a contin-uous non-differentiable fun...
AbstractWe propose a (new) definition of a fractional Laplace’s transform, or Laplace’s transform of...
AbstractWe present the necessary conditions for the existence of the Kolwankar–Gangal local fraction...
International audienceWe study a notion of local fractional differentiation, obtained by localizing ...
In this work, we introduce a definition of a local fractional derivative and a fractional integral ...
In this manuscript we introduced the generalized fractional Riemann-Liouville and Caputo like deriva...
AbstractIn the present article, a set of new difference sequence spaces of fractional order has been...
Riemann’s non-differentiable function is a classic example of a continuous function which is almost ...
AbstractThe method of characteristics has played a very important role in mathematical physics. Prev...