In this paper, we study C^ζ -calculus on generalized Cantor sets, which have self-similar properties and fractional dimensions that exceed their topological dimensions. Functions with fractal support are not differentiable or integrable in terms of standard calculus, so we must involve local fractional derivatives. We have generalized the C^ζ -calculus on the generalized Cantor sets known as middle-ξ Cantor sets. We have suggested a calculus on the middle-ξ Cantor sets for different values of ξ with 0 < ξ < 1. Differential equations on the middle-ξ Cantor sets have been solved, and we have presented the results using illustrative examples. The conditions for super-, normal, and sub-diffusion on fractal sets are given
A new local fractional modified Benjamin–Bona–Mahony equation is proposed within the local fractiona...
The local fractional decomposition method is applied to approximate the solutions for Fokker-Planck ...
AbstractFor n ∈ N, the sets En consist of all α ∈ (0, 1) whose continued fraction expansion involves...
In this paper, we study Cζ-calculus on generalized Cantor sets, which have self-similar propert...
This paper treats the description of non-differentiable dynamics occurring in complex systems gover...
In this paper, a new application of the fractal complex transform via a local fractional derivati...
In this paper, we discuss non-local derivatives on fractal Cantor sets. The scaling properties are g...
Copyright © 2013 Ya-Juan Hao et al. This is an open access article distributed under the Creative Co...
The main object of this paper is to investigate the Helmholtz and diffusion equations on the Cantor ...
We proposed a local fractional series expansion method to solve the wave and diffusion equations on ...
In this manuscript, integrals and derivatives of functions on Cantor tartan spaces are defined. The ...
The middle-third Cantor set is one of the most fundamental examples of self-similar fractal sets int...
Many specialists working in the field of the fractional calculus and its applications simply replace...
We study a special class of generalized continuous fractions, both in real and complex settings, and...
Abstract. An analogue of the Riemannian Geometry for an ultrametric Cantor set (C; d) is described u...
A new local fractional modified Benjamin–Bona–Mahony equation is proposed within the local fractiona...
The local fractional decomposition method is applied to approximate the solutions for Fokker-Planck ...
AbstractFor n ∈ N, the sets En consist of all α ∈ (0, 1) whose continued fraction expansion involves...
In this paper, we study Cζ-calculus on generalized Cantor sets, which have self-similar propert...
This paper treats the description of non-differentiable dynamics occurring in complex systems gover...
In this paper, a new application of the fractal complex transform via a local fractional derivati...
In this paper, we discuss non-local derivatives on fractal Cantor sets. The scaling properties are g...
Copyright © 2013 Ya-Juan Hao et al. This is an open access article distributed under the Creative Co...
The main object of this paper is to investigate the Helmholtz and diffusion equations on the Cantor ...
We proposed a local fractional series expansion method to solve the wave and diffusion equations on ...
In this manuscript, integrals and derivatives of functions on Cantor tartan spaces are defined. The ...
The middle-third Cantor set is one of the most fundamental examples of self-similar fractal sets int...
Many specialists working in the field of the fractional calculus and its applications simply replace...
We study a special class of generalized continuous fractions, both in real and complex settings, and...
Abstract. An analogue of the Riemannian Geometry for an ultrametric Cantor set (C; d) is described u...
A new local fractional modified Benjamin–Bona–Mahony equation is proposed within the local fractiona...
The local fractional decomposition method is applied to approximate the solutions for Fokker-Planck ...
AbstractFor n ∈ N, the sets En consist of all α ∈ (0, 1) whose continued fraction expansion involves...