Lipschitz equivalence of fractal sets in R

Lipschitz equivalence of fractal sets in R

Let T(q, D) be a self-similar (fractal) set generated by {fi(x) = 1/q((x + di)}^Ni=1 where integer q 〉 1and D = {d1, d2 dN} C R. To show the Lipschitz equivalence of T(q, D) and a dust-iik-e T(q, C), one general restriction is 79 C Q by Peres et al. [Israel] Math, 2000, 117: 353-379]. In this paper,...

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Veröffentlicht in:Science China. Mathematics 2012-10, Vol.55 (10), p.2095-2107
Hauptverfasser: Deng, GuoTai, He, XingGang
Format: Artikel
Sprache:eng
Schlagworte:
Applications of Mathematics
Astronomy
China
Combinatorial analysis
Constrictions
Criteria
Equivalence
Fractal analysis
Fractals
Functions (mathematics)
Lipschitz
Mathematical analysis
Mathematics
Mathematics and Statistics
Self-similarity
以色列
分形集
技术使用
等价
自相似集
迭代函数系统
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Zusammenfassung:Let T(q, D) be a self-similar (fractal) set generated by {fi(x) = 1/q((x + di)}^Ni=1 where integer q 〉 1and D = {d1, d2 dN} C R. To show the Lipschitz equivalence of T(q, D) and a dust-iik-e T(q, C), one general restriction is 79 C Q by Peres et al. [Israel] Math, 2000, 117: 353-379]. In this paper, we obtain several sufficient criterions for the Lipschitz equivalence of two self-similar sets by using dust-like graph-directed iterating function systems and combinatorial techniques. Several examples are given to illustrate our theory.
ISSN:1674-7283
1006-9283
1869-1862
DOI:10.1007/s11425-012-4444-5