 LOCAL GEOMETRY OF SELF-SIMILAR SETS: TYPICAL BALLS, TANGENT MEASURES AND ASYMPTOTIC SPECTRAManuel Morã N,
Marta Llorente () and
Marãa Eugenia Mera ()
FRACTALS (fractals), 2023, vol. 31, issue 05, 1-20 Abstract: We analyze the local geometric structure of self-similar sets with open set condition through the study of the properties of a distinguished family of spherical neighborhoods, the typical balls. We quantify the complexity of the local geometry of self-similar sets, showing that there are uncountably many classes of spherical neighborhoods that are not equivalent under similitudes. We show that at a tangent level, the uniformity of the Euclidean space is recuperated in the sense that any typical ball is a tangent measure of the measure ν at ν-a.e. point, where ν is any self-similar measure. We characterize the spectrum of asymptotic densities of metric measures in terms of the packing and centered Hausdorff measures. As an example, we compute the spectrum of asymptotic densities of the Sierpiński gasket. Keywords: Self-similar Sets; Hausdorff Measures; Tangent Measures; Density of Measures; Computability of Fractal Measures; Complexity of Topological Spaces; Sierpiński Gasket (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:wsi:fracta:v:31:y:2023:i:05:n:s0218348x23500597 Ordering information: This journal article can be ordered from DOI: 10.1142/S0218348X23500597 Access Statistics for this article FRACTALS (fractals) is currently edited by Tara Taylor More articles in FRACTALS (fractals) from World Scientific Publishing Co. Pte. Ltd. |
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