Fractional Differential Geometry of curves is discussed, with the help of a new fractional derivative, the Λ-fractional derivative, with the corresponding Λ-fractional space. Λ-Fractional derivative completely conforms with the demands of Differential Topology, for the existence of a differential. Therefore Fractional Differential Geometry is established in that Λ-space. The results are pulled back to the initial space
Fractional calculus has a number of applications in the field of science, specially in mathematics. ...
International audienceThe aim of our work is to specify and develop a geometric modeler, based on th...
This book presents the classical theory of curves in the plane and three-dimensional space, and the ...
Applying a new fractional derivative, the Λ- fractional derivative, with the corresponding Λ-fractio...
Following the concepts of fractional differential and Leibnitz’s L-Fractional Derivatives, proposed ...
In recent years, researchers interested in the field of fractals and related subjects have also begu...
International audienceThe deterministic fractal curves and surfaces find many applications in modeli...
Fractional Calculus is a robust mathematical tool with many applications in science and physics. Nev...
Abstract: In this paper, based on Jumarie’s modification of Riemann-Liouville (R-L) fractional calcu...
Abstract: In this paper, based on Jumarie type of Riemann Liouville (R-L) fractional calculus, we ma...
In this paper, we extend the definition of the fractional integral and derivative introduced in [App...
Since modern continuum mechanics is mainly characterized by the strong influence of microstructure, ...
Fractional derivatives have non-local character, although they are not mathematical derivatives, acc...
Fractional mechanics has been recently one of the most efficient branches of mechanics, interpreting...
Abstract: This paper studies the fractional differential problems of two types of fractional analyti...
Fractional calculus has a number of applications in the field of science, specially in mathematics. ...
International audienceThe aim of our work is to specify and develop a geometric modeler, based on th...
This book presents the classical theory of curves in the plane and three-dimensional space, and the ...
Applying a new fractional derivative, the Λ- fractional derivative, with the corresponding Λ-fractio...
Following the concepts of fractional differential and Leibnitz’s L-Fractional Derivatives, proposed ...
In recent years, researchers interested in the field of fractals and related subjects have also begu...
International audienceThe deterministic fractal curves and surfaces find many applications in modeli...
Fractional Calculus is a robust mathematical tool with many applications in science and physics. Nev...
Abstract: In this paper, based on Jumarie’s modification of Riemann-Liouville (R-L) fractional calcu...
Abstract: In this paper, based on Jumarie type of Riemann Liouville (R-L) fractional calculus, we ma...
In this paper, we extend the definition of the fractional integral and derivative introduced in [App...
Since modern continuum mechanics is mainly characterized by the strong influence of microstructure, ...
Fractional derivatives have non-local character, although they are not mathematical derivatives, acc...
Fractional mechanics has been recently one of the most efficient branches of mechanics, interpreting...
Abstract: This paper studies the fractional differential problems of two types of fractional analyti...
Fractional calculus has a number of applications in the field of science, specially in mathematics. ...
International audienceThe aim of our work is to specify and develop a geometric modeler, based on th...
This book presents the classical theory of curves in the plane and three-dimensional space, and the ...