Email this article On a class of self-affine sets on the plane given by six homotheties
- Authors: Bagaev A.V.1
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Affiliations:
- Nizhny Novgorod State Technical University n.a. R.E. Alekseev
- Issue: Vol 25, No 1 (2023)
- Pages: 519-530
- Section: Mathematics
- Submitted: 12.12.2025
- Accepted: 14.12.2025
- Published: 24.12.2025
- URL: https://journals.rcsi.science/2079-6900/article/view/357848
- DOI: https://doi.org/10.15507/2079-6900.25.202301.519-530
- ID: 357848
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Abstract
This paper is devoted to a class of self-affine sets on the plane determined by six homotheties. Centers of these homotheties are located at the vertices of a regular hexagon P, and the homothetic coefficients belong to the interval (0, 1). One must note that equality of homothetic coefficients is not assumed. A self-affine set on the plane is a non-empty compact subset that is invariant with respect to the considered family of homotheties. The existence and uniqueness of such a set is provided by Hutchinson’s theorem. The goal of present work is to investigate the influence of homothetic coefficients on the properties of a self-affine set. To describe the set, barycentric coordinates on the plane are introduced. The conditions are found under which the self-affine set is: a) the hexagon P; b) a Cantor set in the hexagon P. The Minkowski and the Hausdorff dimensions of the indicated sets are calculated. The conditions providing vanishing Lebesgue measure of self-affine set are obtained. Examples of self-affine sets from the considered class are presented.
About the authors
Andrey V. Bagaev
Nizhny Novgorod State Technical University n.a. R.E. Alekseev
Author for correspondence.
Email: a.v.bagaev@gmail.com
ORCID iD: 0000-0001-5155-4175
Associate Professor, Department of Applied Mathematics
Russian Federation, 24 Minina St., Nizhny Novgorod 603950, RussiaReferences
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