On the Katugampola fractional integral and dimensional analysis of the fractal basin boundary for a random dynamical system
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Publication:6599859
DOI10.1016/j.physd.2024.134289zbMATH Open1548.26008MaRDI QIDQ6599859
Yong Shun Liang, Unnamed Author
Publication date: 6 September 2024
Published in: Physica D (Search for Journal in Brave)
potential theoryrandom dynamical systemsfractal dimensionKatugampola fractional integralfractal basin boundaryWeierstrass-type function with random phases
Fractional derivatives and integrals (26A33) Fractals (28A80) Dimension theory of smooth dynamical systems (37C45)
Cites Work
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- A physically based connection between fractional calculus and fractal geometry
- The Weyl-Marchaud fractional derivative of a type of self-affine functions
- On the connection between the order of the fractional derivative and the Hausdorff dimension of a fractal function
- New approach to a generalized fractional integral
- Mellin transform analysis and integration by parts for Hadamard-type fractional integrals
- Box dimensions of Riemann-Liouville fractional integrals of continuous functions of bounded variation
- Fractional differential equations. An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications
- Hausdorff dimension of the graphs of the classical Weierstrass functions
- On the random series \(\sum\pm\lambda^ n\) (an Erdös problem)
- A note on Katugampola fractional calculus and fractal dimensions
- Katugampola fractional integral and fractal dimension of bivariate functions
- Box dimension of mixed Katugampola fractional integral of two-dimensional continuous functions
- Fractal dimension of graph of Katugampola fractional integral and some general characterizations
- A review of definitions of fractional derivatives and other operators
- Fractal dimension of Riemann-Liouville fractional integral of 1-dimensional continuous functions
- New relationships connecting a class of fractal objects and fractional integrals in space
- The fractal dimensions of graphs of the Weyl-Marchaud fractional derivative of the Weierstrass-type function
- Sets of fractional dimensions V: On dimensional numbers of some continuous curves.
- Fractal dimensions of mixed Katugampola fractional integral associated with vector valued functions
- New integrable multi-Lévy-index and mixed fractional nonlinear soliton hierarchies
- The box dimension of self-affine graphs and repellers
- On the Hausdorff dimension of some fractal sets
- The Lyapunov dimension of a nowhere differentiable attracting torus
- Smooth Dynamics on Weierstrass Nowhere Differentiable Curves
- On the Hausdorff Dimension of Some Graphs
- The packing measure of the graphs and level sets of certain continuous functions
- On the Weierstrass-Mandelbrot fractal function
- Fractional Differentiation in the Self‐Affine Case. V ‐ The Local Degree of Differentiability
- THE RELATIONSHIP BETWEEN FRACTIONAL CALCULUS AND FRACTALS
- The Hausdorff dimension of graphs of Weierstrass functions
- THE HADAMARD FRACTIONAL CALCULUS OF A FRACTAL FUNCTION
- ESTIMATION OF FRACTAL DIMENSION OF WEYL FRACTIONAL INTEGRAL OF CERTAIN CONTINUOUS FUNCTIONS
- A New Approach to Generalized Fractional Derivatives
- Box Dimension of Weyl Fractional Integral of Continuous Functions with Bounded Variation
- On the Connection between the Order of Riemann-Liouvile Fractional Calculus and Hausdorff Dimension of a Fractal Function
- The Hausdorff Dimension of the Graphs of Continuous Self-Affine Functions
- FRACTAL DIMENSIONS OF KATUGAMPOLA FRACTIONAL INTEGRAL OF CONTINUOUS FUNCTIONS SATISFYING HÖLDER CONDITION
- Fractional derivatives of Weierstrass-type functions
- General fractional integrals and derivatives and their applications
- On two special classes of fractal surfaces with certain Hausdorff and Box dimensions
- A geometric based connection between fractional calculus and fractal functions
- Fractional dispersive models and applications. Recent developments and future perspectives
- Dynamics of fractional \(N\)-soliton solutions with anomalous dispersions of integrable fractional higher-order nonlinear Schrödinger equations
- Spontaneous symmetry breaking and ghost states supported by the fractional \(\mathcal{PT}\)-symmetric saturable nonlinear Schrödinger equation
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