Adsorption on Fractal Surfaces: A Non Linear Modeling Approach of a Fractional Behavior
Abstract
:1. Introduction
2. Evidence of the Fractional Asymptotic Behavior of Some Fractal Surfaces
Algorithm 1 Random Sequential Adsorption |
A random point of the fractal is selected at each iteration of the process. A disc of radius R and center c will fix on the surface if:
|
3. Power-Law Non Linear Dynamical Modeling
3.1. Detailed Modeling Approach on the Vicsek Fractal
3.2. Result for the Other Fractals
4. Conclusions
Author Contributions
Funding
Institutional Review Board Statement
Informed Consent Statement
Data Availability Statement
Acknowledgments
Conflicts of Interest
References
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Fractal | Final Value |
---|---|
Vicsek | ∼0.68 |
Sierpinski triangle | ∼0.62 |
Sierpinski carpet | ∼0.58 |
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Tartaglione, V.; Sabatier, J.; Farges, C. Adsorption on Fractal Surfaces: A Non Linear Modeling Approach of a Fractional Behavior. Fractal Fract. 2021, 5, 65. https://doi.org/10.3390/fractalfract5030065
Tartaglione V, Sabatier J, Farges C. Adsorption on Fractal Surfaces: A Non Linear Modeling Approach of a Fractional Behavior. Fractal and Fractional. 2021; 5(3):65. https://doi.org/10.3390/fractalfract5030065
Chicago/Turabian StyleTartaglione, Vincent, Jocelyn Sabatier, and Christophe Farges. 2021. "Adsorption on Fractal Surfaces: A Non Linear Modeling Approach of a Fractional Behavior" Fractal and Fractional 5, no. 3: 65. https://doi.org/10.3390/fractalfract5030065
APA StyleTartaglione, V., Sabatier, J., & Farges, C. (2021). Adsorption on Fractal Surfaces: A Non Linear Modeling Approach of a Fractional Behavior. Fractal and Fractional, 5(3), 65. https://doi.org/10.3390/fractalfract5030065