On classification of singular measures and fractal properties of quasi-self-affine measures in R2

Sergio Albeverio; Vyacheslav Koval; Mykola Pratsiovytyi; G. Torbin

doi:10.1515/ROSE.2008.010

Published by De Gruyter September 11, 2008

On classification of singular measures and fractal properties of quasi-self-affine measures in R²

Sergio Albeverio , Vyacheslav Koval , Mykola Pratsiovytyi and G. Torbin

From the journal Random Operators and Stochastic Equations

https://doi.org/10.1515/ROSE.2008.010

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Abstract

A multidimensional classification of singularly continuous (w.r.t. the Lebesgue measure) probability measures in R² is introduced and a theorem on canonical representation of such measures is proven. A class of random elements on the unit square which is defined by a system of partitions generated by the Q*-representation of real numbers is introduced and studied in details. Conditions for the discreteness, absolute continuity resp. singular continuity (w.r.t. Lebesgue measure) of the corresponding probability measures are found. Metric, topological and fractal properties of the spectra of the corresponding probability distributions are investigated. A class of transformations preserving the Hausdorff-Besicovitch dimension of any subset of the unit square (DP-transformations) is also studied.

Key words.: Singularly continuous probability measures; Q*-representation of real numbers; -representation; self-affine sets; fractals; Hausdorff dimension; DP-transformations; classification of singular measures

Received: 2007-12-02

Published Online: 2008-09-11

Published in Print: 2008-August

On classification of singular measures and fractal properties of quasi-self-affine measures in R²

Abstract

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