Fractal squares with finitely many connected components *
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Publication:4986203
DOI10.1088/1361-6544/abd611zbMath1466.28013arXiv1910.05745OpenAlexW2979472998MaRDI QIDQ4986203
Publication date: 27 April 2021
Published in: Nonlinearity (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1910.05745
Related Items (4)
On the existence of cut points of connected generalized Sierpiński carpets ⋮ Gap sequences and Topological properties of Bedford–McMullen sets* ⋮ On the connected components of IFS fractals ⋮ Corrigendum: Fractal squares with finitely many connected components (2021 Nonlinearity 34 1817–1836)
Cites Work
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- Topological invariants and Lipschitz equivalence of fractal squares
- Connected generalised Sierpiński carpets
- Lipschitz equivalence of self-similar sets and hyperbolic boundaries
- Topological properties of self-similar fractals with one parameter
- Topological structure of fractal squares
- Lipschitz equivalence of Cantor sets and algebraic properties of contraction ratios
- Lipschitz Equivalence of Self-Similar Sets: Algebraic and Geometric Properties
- Gap sequence, Lipschitz equivalence and box dimension of fractal sets
- On the structure of self-similar sets
- Self‐Similar Sets 2. A Simple Approach to the Topological Structure of Fractals
- On the Lipschitz equivalence of Cantor sets
- Self‐similar sets, simple augmented trees and their Lipschitz equivalence
- TOPOLOGICAL STRUCTURE OF SELF-SIMILAR SETS
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