A generalization of fractional vector calculus (FVC) as a self-consistent mathematical theory is proposed to take into account a general form of non-locality in kernels of fractional vector differential and integral operators. Self-consistency involves proving generalizations of all fundamental theorems of vector calculus for generalized kernels of operators. In the generalization of FVC from power-law nonlocality to the general form of nonlocality in space, we use the general fractional calculus (GFC) in the Luchko approach, which was published in 2021. This paper proposed the following: (I) Self-consistent definitions of general fractional differential vector operators: the regional and line general fractional gradients, the regional and ...
Fractional calculus is allowing integrals and derivatives of any positive order (the term 'fractiona...
A generalized differential operator on the real line is defined by means of a limiting process. When...
The fractional derivative has a long history in mathematics dating back further than integer-order d...
This paper reviews the fractional vectorial differential operators proposed previously and introduce...
General fractional dynamics (GFDynamics) can be viewed as an interdisciplinary science, in which the...
For the first time, a general fractional calculus of arbitrary order was proposed by Yuri Luchko in ...
Abstract. The object of this paper is to establish certain generalized fractional integration and di...
We investigate a fractional notion of gradient and divergence operator. We generalize the div-curl e...
Since modern continuum mechanics is mainly characterized by the strong influence of microstructure, ...
AbstractWe propose a unified approach to the so-called Special Functions of Fractional Calculus (SFs...
This paper presents some new formulas and properties of the generalized fractional derivative with n...
Abstract. In this paper we provide a definition of fractional gradient opera-tors, related to direct...
This paper builds upon our recent paper on generalized fractional variational calculus (FVC). Here, ...
2000 Mathematics Subject Classification: 26A33, 33C60, 44A20In this survey we present a brief histor...
AbstractThis paper introduces three new operators and presents some of their properties. It defines ...
Fractional calculus is allowing integrals and derivatives of any positive order (the term 'fractiona...
A generalized differential operator on the real line is defined by means of a limiting process. When...
The fractional derivative has a long history in mathematics dating back further than integer-order d...
This paper reviews the fractional vectorial differential operators proposed previously and introduce...
General fractional dynamics (GFDynamics) can be viewed as an interdisciplinary science, in which the...
For the first time, a general fractional calculus of arbitrary order was proposed by Yuri Luchko in ...
Abstract. The object of this paper is to establish certain generalized fractional integration and di...
We investigate a fractional notion of gradient and divergence operator. We generalize the div-curl e...
Since modern continuum mechanics is mainly characterized by the strong influence of microstructure, ...
AbstractWe propose a unified approach to the so-called Special Functions of Fractional Calculus (SFs...
This paper presents some new formulas and properties of the generalized fractional derivative with n...
Abstract. In this paper we provide a definition of fractional gradient opera-tors, related to direct...
This paper builds upon our recent paper on generalized fractional variational calculus (FVC). Here, ...
2000 Mathematics Subject Classification: 26A33, 33C60, 44A20In this survey we present a brief histor...
AbstractThis paper introduces three new operators and presents some of their properties. It defines ...
Fractional calculus is allowing integrals and derivatives of any positive order (the term 'fractiona...
A generalized differential operator on the real line is defined by means of a limiting process. When...
The fractional derivative has a long history in mathematics dating back further than integer-order d...