Besicoviteh (1941) and Egglestone (1949) analyzed subsets of points of the unit interval with given frequencies in the figures of their base-p expansions. We extend this analysis to self-similar sets, by replacing the frequencies of figures with the frequencies of the generating similitudes. We focus on the interplay among such sets, self-similar measures, and Hausdorff measures. We give a fine-tuned classification of the Hausdorff measures according to the singularity of the self-similar measures with respect to those measures. We show that the self-similar measures are concentrated on sets whose frequencies of similitudes obey the law of the iterated logarith
Let K and mu be the self-similar set and the self-similar measure associated with an IFS (iterated f...
AbstractThis paper is concerned with the question whether each self-similar set on R1 with positive ...
AbstractRecently, Barreira and Schmeling (2000) [1] and Chen and Xiong (1999) [2] have shown, that f...
Self-similar measures can be obtained by regarding the self similar set generated by a system of sim...
A contractive similarity is a function which preserves the geometry of a object but shrinks it down ...
In this paper, we investigate the Hausdorff dimension of the invariant measures of the iterated func...
AbstractWe have given several necessary and sufficient conditions for statistically self-similar set...
We analyze the local bahaviour of the Hausdorff measure and the packing measure of self-similar sets...
In this paper we study the absolute continuity of self-similar measures defined by iterated function...
Consider an iterated function system consisting of similarities on the complex plane of the form $g_...
We study self-similar measures defined by non-uniformly contractive iterated function systems of sim...
We prove that for all \(s\in(0,d)\) and \(c\in (0,1)\) there exists a self-similar set \(E\subset\ma...
AbstractWe study asymptotical properties of some particular sequences U = (un)n≥1 of real numbers 0≤...
We study the geometric properties of random multiplicative cascade measures defined on self-similar ...
We show that in many parametrized families of self-similar measures, their projections, and their co...
Let K and mu be the self-similar set and the self-similar measure associated with an IFS (iterated f...
AbstractThis paper is concerned with the question whether each self-similar set on R1 with positive ...
AbstractRecently, Barreira and Schmeling (2000) [1] and Chen and Xiong (1999) [2] have shown, that f...
Self-similar measures can be obtained by regarding the self similar set generated by a system of sim...
A contractive similarity is a function which preserves the geometry of a object but shrinks it down ...
In this paper, we investigate the Hausdorff dimension of the invariant measures of the iterated func...
AbstractWe have given several necessary and sufficient conditions for statistically self-similar set...
We analyze the local bahaviour of the Hausdorff measure and the packing measure of self-similar sets...
In this paper we study the absolute continuity of self-similar measures defined by iterated function...
Consider an iterated function system consisting of similarities on the complex plane of the form $g_...
We study self-similar measures defined by non-uniformly contractive iterated function systems of sim...
We prove that for all \(s\in(0,d)\) and \(c\in (0,1)\) there exists a self-similar set \(E\subset\ma...
AbstractWe study asymptotical properties of some particular sequences U = (un)n≥1 of real numbers 0≤...
We study the geometric properties of random multiplicative cascade measures defined on self-similar ...
We show that in many parametrized families of self-similar measures, their projections, and their co...
Let K and mu be the self-similar set and the self-similar measure associated with an IFS (iterated f...
AbstractThis paper is concerned with the question whether each self-similar set on R1 with positive ...
AbstractRecently, Barreira and Schmeling (2000) [1] and Chen and Xiong (1999) [2] have shown, that f...