Finite type in measure sense for self-similar sets with overlaps

被引：0

作者：

Juan Deng

Zhiying Wen

Lifeng Xi

机构：

[1] ShenZhen University,Department of Mathematics

[2] Tsinghua University,Department of Mathematics

[3] Ningbo University,Department of Mathematics

[4] Hunan Normal University,Key Laboratory of Computing and Stochastic Mathematics (Ministry of Education), School of Mathematics and Statistics

来源：

Mathematische Zeitschrift | 2021年 / 298卷

关键词：

Self-similar set; Finite type in measure sense; Weak separation condition; Generalized finite type; 28A80;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

For self-similar sets with overlaps, we introduce a notion named the finite type in measure sense and reveal its intrinsic relationships with the weak separation condition and the generalized finite type.

引用

页码：821 / 837

页数：16

共 42 条

[1] Akiyama S(2013)Discrete spectra and Pisot numbers J. Number Theory 133 375-390
[2] Komornik V(1992)Self-similar sets 7. A characterization of self-similar fractals with positive Hausdorr measure Proc. Am. Math. Soc 114 995-1001
[3] Bandt C(2011)Finite type, open set condition and weak separation condition Nonlinearity. 9 2489-2503
[4] Graf S(2016)On the topology of polynomial with bounded integer coefficients J. Eur. Math. Soc. 18 181-193
[5] Das M(2009)Multifractal formalism for self-similar measures with weak separation condition J. Math. Pures. Appl. 92 407-428
[6] Edgar GA(2015)On the Assouad dimension of self-similar sets with overlaps Adv. Math. 273 188-214
[7] Feng DJ(1981)Fractals and self-similarity Indiana Univ. Math. J. 30 713-747
[8] Feng D-J(2014)On self-similar sets with overlaps and inverse theorems for entropy Ann. Math. 180 773-822
[9] Lau K-S(2005)General finite type IFS and M-matrix Comm. Anal. Geom 13 821-843
[10] Fraser JM(1997)Projecting the one dimensional Sierpinski gasket Israel J. Math. 97 221-238

← 1 2 3 4 5 →