AbstractIn this paper we study a class of subset of Sierpinski carpets for which the allowed digits in the expansions fall into each fiber set with a prescribed frequency. We calculate the Hausdorff and packing dimensions of these subsets and give necessary and sufficient conditions for the corresponding Hausdorff and packing measures to be finite
Abstract. The notions of shyness and prevalence generalize the property of being zero and full Haar ...
The notions of shyness and prevalence generalize the property of being zero and full Haar measure to...
AbstractGeneralised Sierpiński carpets are planar sets that generalise the well-known Sierpiński car...
AbstractIn this paper we study a class of subset of Sierpinski carpets for which the allowed digits ...
AbstractIn this paper we study a class of subsets of the general Sierpinski carpets for which the li...
AbstractIn this paper we obtain the exact value of the Hausdorff measure of a class of Sierpinski ca...
In this paper we study certain conformal iterated function schemes in two dimensions that are natura...
In this dissertation, we study the Hausdorff dimension and measures of full Hausdorff dimension for ...
In 2015, R. Balkaa, Z. Buczolich and M. Elekes introduced the topological Hausdoff dimension which i...
We show that the s-dimensional packing measure P^{s}(S) of the Sierpinski gasket S, where s=((log3)/...
AbstractBy a new method, we obtain the lower and upper bounds of the Hausdorff measure of the Sierpi...
In this paper we apply some results about general conformal iterated function systems toA, the resid...
In the context of fractal geometry, the natural extension of volume in Euclidean space is given by H...
In this thesis, Hausdorff, packing and capacity dimensions are studied by evaluating sets in the Euc...
AbstractFor level sets related to the tangential dimensions of Bernoulli measures, the Hausdorff and...
Abstract. The notions of shyness and prevalence generalize the property of being zero and full Haar ...
The notions of shyness and prevalence generalize the property of being zero and full Haar measure to...
AbstractGeneralised Sierpiński carpets are planar sets that generalise the well-known Sierpiński car...
AbstractIn this paper we study a class of subset of Sierpinski carpets for which the allowed digits ...
AbstractIn this paper we study a class of subsets of the general Sierpinski carpets for which the li...
AbstractIn this paper we obtain the exact value of the Hausdorff measure of a class of Sierpinski ca...
In this paper we study certain conformal iterated function schemes in two dimensions that are natura...
In this dissertation, we study the Hausdorff dimension and measures of full Hausdorff dimension for ...
In 2015, R. Balkaa, Z. Buczolich and M. Elekes introduced the topological Hausdoff dimension which i...
We show that the s-dimensional packing measure P^{s}(S) of the Sierpinski gasket S, where s=((log3)/...
AbstractBy a new method, we obtain the lower and upper bounds of the Hausdorff measure of the Sierpi...
In this paper we apply some results about general conformal iterated function systems toA, the resid...
In the context of fractal geometry, the natural extension of volume in Euclidean space is given by H...
In this thesis, Hausdorff, packing and capacity dimensions are studied by evaluating sets in the Euc...
AbstractFor level sets related to the tangential dimensions of Bernoulli measures, the Hausdorff and...
Abstract. The notions of shyness and prevalence generalize the property of being zero and full Haar ...
The notions of shyness and prevalence generalize the property of being zero and full Haar measure to...
AbstractGeneralised Sierpiński carpets are planar sets that generalise the well-known Sierpiński car...