On the Fractal Properties of Generalized Cantor Sets and Devil's Staircase Functions

Devos, Thomas; Loosveldt, Laurent; Nicolay, Samuel

doi:10.1007/s40879-025-00837-6

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On the Fractal Properties of Generalized Cantor Sets and Devil's Staircase Functions

Devos, Thomas; Loosveldt, Laurent; Nicolay, Samuel

2025 • In European Journal of Mathematics, 11

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https://hdl.handle.net/2268/327898

DOI
10.1007/s40879-025-00837-6

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Keywords :

Cantor function; Cantor expansions; Cantor set; Hölder exponent

Abstract :

[en] We present a generalization of Cantor's ternary set and ternary function through the Cantor expansion of real numbers. Our analysis demonstrates that the Hausdorff dimension of these generalized sets and the Hölder regularity of the corresponding functions are influenced by the specific sequence used to define the expansion. Additionally, we explore the measure-theoretic properties of these sets through their Hausdorff h-measure, highlighting the connections between numeral systems and fractal geometry.

Research Center/Unit :

Mathematics - ULiège

Disciplines :

Mathematics

Author, co-author :

Devos, Thomas ; Université de Liège - ULiège > Faculté des Sciences > Master sc. mathématiques, fin. appr.

Loosveldt, Laurent ; Université de Liège - ULiège > Département de mathématique > Probabilités - Analyse stochastique

Nicolay, Samuel ; Université de Liège - ULiège > Département de mathématique > Analyse - Analyse fonctionnelle - Ondelettes

Language :

English

Title :

On the Fractal Properties of Generalized Cantor Sets and Devil's Staircase Functions

Publication date :

16 June 2025

Journal title :

European Journal of Mathematics

ISSN :

2199-675X

eISSN :

2199-6768

Publisher :

Springer, Cham, Switzerland

Volume :

Peer reviewed :

Peer Reviewed verified by ORBi

Available on ORBi :

since 03 February 2025

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