Ndiaye, M. (2021) Combining Fractals and Box-Counting Dimension. Applied Mathematics, 12 (09). pp. 818-834. ISSN 2152-7385
Text
am_2021092914213391.pdf - Published Version
Download (630kB)
am_2021092914213391.pdf - Published Version
Download (630kB)
Official URL: https://doi.org/10.4236/am.2021.129055
Abstract
In this paper, the box-counting dimension is used to derive an explicit formula for the dimension of a fractal constructed using several contractions or by combining fractals. This dimension agrees with the Hausdorff dimension in the particular case when the scales factors considered are all the same. A more general sufficient condition for the box-counting dimension and the Hausdorff dimension to be the same is given. It is also shown that the dimension of the fractal obtained by combining two fractals is the weighted average of the dimensions of the two fractals.
Item Type: | Article |
---|---|
Subjects: | SCI Archives > Mathematical Science |
Depositing User: | Managing Editor |
Date Deposited: | 01 Dec 2022 05:13 |
Last Modified: | 03 Aug 2024 04:42 |
URI: | http://science.classicopenlibrary.com/id/eprint/636 |