Cookie-cutter-like sets with graph-directed construction

Shen Fan; Qing Hui Liu; Zhi Ying Wen

doi:10.1007/978-0-8176-8400-6_12

Cookie-cutter-like sets with graph-directed construction

Shen Fan^*, Qing Hui Liu, Zhi Ying Wen

^*Corresponding author for this work

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Abstract

In this chapter, we extend the cookie-cutter-like construction introduced by Ma, Rao, and Wen to the case having the graph-directed construction which is introduced by Mauldin and Williams and obtain a new class of fractals, which can be used to study the dimensions of the spectrum of discrete Schrödinger operators. Under suitable assumptions we prove that this class of fractals possesses the properties of bounded variation, bounded distortion, bounded covariation, and the existence of Gibbs-like measures. With these properties we give expressions for the Hausdorff dimensions, box dimensions, and packing dimensions of the fractals. We also discuss the continuous dependence of the dimensions on the defining data.

Original language	English
Title of host publication	Further Developments in Fractals and Related Fields
Editors	Julien Barral, Stéphane Seuret
Publisher	Springer International Publishing
Pages	235-254
Number of pages	20
ISBN (Print)	9780817683993
DOIs	https://doi.org/10.1007/978-0-8176-8400-6_12
Publication status	Published - 2013
Externally published	Yes
Event	International Conference on Fractals and Related Fields, 2011 - Porquerolles Island, France Duration: 1 Jun 2011 → …

Publication series

Name	Trends in Mathematics
Volume	55
ISSN (Print)	2297-0215
ISSN (Electronic)	2297-024X

Conference

Conference	International Conference on Fractals and Related Fields, 2011
Country/Territory	France
City	Porquerolles Island
Period	1/06/11 → …

Access to Document

10.1007/978-0-8176-8400-6_12

Cite this

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title = "Cookie-cutter-like sets with graph-directed construction",

abstract = "In this chapter, we extend the cookie-cutter-like construction introduced by Ma, Rao, and Wen to the case having the graph-directed construction which is introduced by Mauldin and Williams and obtain a new class of fractals, which can be used to study the dimensions of the spectrum of discrete Schr{\"o}dinger operators. Under suitable assumptions we prove that this class of fractals possesses the properties of bounded variation, bounded distortion, bounded covariation, and the existence of Gibbs-like measures. With these properties we give expressions for the Hausdorff dimensions, box dimensions, and packing dimensions of the fractals. We also discuss the continuous dependence of the dimensions on the defining data.",

author = "Shen Fan and Liu, {Qing Hui} and Wen, {Zhi Ying}",

note = "Publisher Copyright: {\textcopyright} Springer Science+Business Media New York 2013.; International Conference on Fractals and Related Fields, 2011 ; Conference date: 01-06-2011",

year = "2013",

doi = "10.1007/978-0-8176-8400-6_12",

language = "English",

isbn = "9780817683993",

series = "Trends in Mathematics",

publisher = "Springer International Publishing",

pages = "235--254",

editor = "Julien Barral and St{\'e}phane Seuret",

booktitle = "Further Developments in Fractals and Related Fields",

address = "Switzerland",

}

Fan, S, Liu, QH & Wen, ZY 2013, Cookie-cutter-like sets with graph-directed construction. in J Barral & S Seuret (eds), Further Developments in Fractals and Related Fields. Trends in Mathematics, vol. 55, Springer International Publishing, pp. 235-254, International Conference on Fractals and Related Fields, 2011, Porquerolles Island, France, 1/06/11. https://doi.org/10.1007/978-0-8176-8400-6_12

Cookie-cutter-like sets with graph-directed construction. / Fan, Shen; Liu, Qing Hui; Wen, Zhi Ying.
Further Developments in Fractals and Related Fields. ed. / Julien Barral; Stéphane Seuret. Springer International Publishing, 2013. p. 235-254 (Trends in Mathematics; Vol. 55).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

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T1 - Cookie-cutter-like sets with graph-directed construction

AU - Fan, Shen

AU - Liu, Qing Hui

AU - Wen, Zhi Ying

N1 - Publisher Copyright: © Springer Science+Business Media New York 2013.

PY - 2013

Y1 - 2013

N2 - In this chapter, we extend the cookie-cutter-like construction introduced by Ma, Rao, and Wen to the case having the graph-directed construction which is introduced by Mauldin and Williams and obtain a new class of fractals, which can be used to study the dimensions of the spectrum of discrete Schrödinger operators. Under suitable assumptions we prove that this class of fractals possesses the properties of bounded variation, bounded distortion, bounded covariation, and the existence of Gibbs-like measures. With these properties we give expressions for the Hausdorff dimensions, box dimensions, and packing dimensions of the fractals. We also discuss the continuous dependence of the dimensions on the defining data.

AB - In this chapter, we extend the cookie-cutter-like construction introduced by Ma, Rao, and Wen to the case having the graph-directed construction which is introduced by Mauldin and Williams and obtain a new class of fractals, which can be used to study the dimensions of the spectrum of discrete Schrödinger operators. Under suitable assumptions we prove that this class of fractals possesses the properties of bounded variation, bounded distortion, bounded covariation, and the existence of Gibbs-like measures. With these properties we give expressions for the Hausdorff dimensions, box dimensions, and packing dimensions of the fractals. We also discuss the continuous dependence of the dimensions on the defining data.

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SN - 9780817683993

T3 - Trends in Mathematics

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BT - Further Developments in Fractals and Related Fields

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A2 - Seuret, Stéphane

PB - Springer International Publishing

T2 - International Conference on Fractals and Related Fields, 2011

Y2 - 1 June 2011

ER -

Cookie-cutter-like sets with graph-directed construction

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