Gap sequence, Lipschitz equivalence and box dimension of fractal sets
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Publication:3507967
DOI10.1088/0951-7715/21/6/011zbMath1154.28004OpenAlexW1989539350MaRDI QIDQ3507967
Hui Rao, Huo-Jun Ruan, Ya-min Yang
Publication date: 24 June 2008
Published in: Nonlinearity (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1088/0951-7715/21/6/011
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Lipschitz equivalence of Cantor sets and algebraic properties of contraction ratios ⋮ A DICHOTOMY OF STRONG OPEN SET CONDITION OF SELF-CONFORMAL SETS ⋮ MULTIFRACTAL ANALYSIS OF SOME WEIGHTED QUASI-SELF-SIMILAR FUNCTIONS ⋮ Quasisymmetric equivalence of self-similar sets ⋮ Gap sequences and Topological properties of Bedford–McMullen sets* ⋮ Relations between topological and metrical properties of self-affine Sierpiński sponges ⋮ Distribution of \(\delta \)-connected components of self-affine sponges of Lalley-Gatzouras type ⋮ Lipschitz equivalence of fractal sets in \(\mathbb R\) ⋮ Gap sequences of McMullen sets ⋮ Gap sequences of fractal squares ⋮ Topological invariants and Lipschitz equivalence of fractal squares ⋮ A dimension drop phenomenon of fractal cubes ⋮ Higher dimensional Frobenius problem and Lipschitz equivalence of Cantor sets ⋮ Fractal squares with finitely many connected components * ⋮ Gap sequences of self-conformal sets
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