Noteworthy fractal features and transport properties of Cantor tartans

Alexander S. Balankin; Alireza K. Golmankhaneh; Julián Patiño-Ortiz; Miguel Patiño-Ortiz

doi:10.1016/j.physleta.2018.04.011

Noteworthy fractal features and transport properties of Cantor tartans

Alexander S. Balankin, Alireza K. Golmankhaneh, Julián Patiño-Ortiz, Miguel Patiño-Ortiz

Escuela Superior de Ingeniería Mecánica y Eléctrica (ESIME), Unidad Zacatenco

Research output: Contribution to journal › Article › peer-review

32 Scopus citations

Abstract

This Letter is focused on the impact of fractal topology on the transport processes governed by different kinds of random walks on Cantor tartans. We establish that the spectral dimension of the infinitely ramified Cantor tartan d_s is equal to its fractal (self-similarity) dimension D. Consequently, the random walk on the Cantor tartan leads to a normal diffusion. On the other hand, the fractal geometry of Cantor tartans allows for a natural definition of power-law distributions of the waiting times and step lengths of random walkers. These distributions are Lévy stable if D>1.5. Accordingly, we found that the random walk with rests leads to sub-diffusion, whereas the Lévy walk leads to ballistic diffusion. The Lévy walk with rests leads to super-diffusion, if D>3, or sub-diffusion, if 1.5<D<3.

Original language	English
Pages (from-to)	1534-1539
Number of pages	6
Journal	Physics Letters, Section A: General, Atomic and Solid State Physics
Volume	382
Issue number	23
DOIs	https://doi.org/10.1016/j.physleta.2018.04.011
State	Published - 12 Jun 2018

Keywords

Anomalous diffusion
Cantor tartan
Fractal networks
Mass and momentum transport
Random walks
Spectral dimension

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10.1016/j.physleta.2018.04.011

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title = "Noteworthy fractal features and transport properties of Cantor tartans",

abstract = "This Letter is focused on the impact of fractal topology on the transport processes governed by different kinds of random walks on Cantor tartans. We establish that the spectral dimension of the infinitely ramified Cantor tartan ds is equal to its fractal (self-similarity) dimension D. Consequently, the random walk on the Cantor tartan leads to a normal diffusion. On the other hand, the fractal geometry of Cantor tartans allows for a natural definition of power-law distributions of the waiting times and step lengths of random walkers. These distributions are L{\'e}vy stable if D>1.5. Accordingly, we found that the random walk with rests leads to sub-diffusion, whereas the L{\'e}vy walk leads to ballistic diffusion. The L{\'e}vy walk with rests leads to super-diffusion, if D>3, or sub-diffusion, if 1.5<D<3.",

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AU - Balankin, Alexander S.

AU - Golmankhaneh, Alireza K.

AU - Patiño-Ortiz, Julián

AU - Patiño-Ortiz, Miguel

PY - 2018/6/12

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N2 - This Letter is focused on the impact of fractal topology on the transport processes governed by different kinds of random walks on Cantor tartans. We establish that the spectral dimension of the infinitely ramified Cantor tartan ds is equal to its fractal (self-similarity) dimension D. Consequently, the random walk on the Cantor tartan leads to a normal diffusion. On the other hand, the fractal geometry of Cantor tartans allows for a natural definition of power-law distributions of the waiting times and step lengths of random walkers. These distributions are Lévy stable if D>1.5. Accordingly, we found that the random walk with rests leads to sub-diffusion, whereas the Lévy walk leads to ballistic diffusion. The Lévy walk with rests leads to super-diffusion, if D>3, or sub-diffusion, if 1.5<D<3.

AB - This Letter is focused on the impact of fractal topology on the transport processes governed by different kinds of random walks on Cantor tartans. We establish that the spectral dimension of the infinitely ramified Cantor tartan ds is equal to its fractal (self-similarity) dimension D. Consequently, the random walk on the Cantor tartan leads to a normal diffusion. On the other hand, the fractal geometry of Cantor tartans allows for a natural definition of power-law distributions of the waiting times and step lengths of random walkers. These distributions are Lévy stable if D>1.5. Accordingly, we found that the random walk with rests leads to sub-diffusion, whereas the Lévy walk leads to ballistic diffusion. The Lévy walk with rests leads to super-diffusion, if D>3, or sub-diffusion, if 1.5<D<3.

KW - Anomalous diffusion

KW - Cantor tartan

KW - Fractal networks

KW - Mass and momentum transport

KW - Random walks

KW - Spectral dimension

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DO - 10.1016/j.physleta.2018.04.011

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EP - 1539

JO - Physics Letters, Section A: General, Atomic and Solid State Physics

JF - Physics Letters, Section A: General, Atomic and Solid State Physics

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ER -

Noteworthy fractal features and transport properties of Cantor tartans

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