Abstract. We study Hausdorff and packing dimensions of subsets of a coding space with an ultra metric from a multifractal spectrum induced by a self-similar measure on a Cantor set using a function satisfying a Hölder condition. 1
We show that there are Hilbert spaces constructed from the Hausdorff measures Hs on the real line R ...
Abstract. We study the Hausdorff dimension of a large class of sets in the real line defined in term...
In this thesis, Hausdorff, packing and capacity dimensions are studied by evaluating sets in the Euc...
AbstractLet X be a metric space and μ a Borel probability measure on X. For q, t ∈ R and E ⊆ X write...
In this article we study Cantor sets defined by monotone sequences, in the sense of Besicovich and T...
In this thesis, we consider the Hausdorff dimension of the set of points with multiple codings. In o...
AbstractThe multifractal structure of measures generated by iterated function systems (IFS) with ove...
A family of sets {F-d}(d) is said to be 'represented by the measure mu' if, for each d, the set F-d ...
Let mu be a Borel probability measure on R-d. We study the Hausdorff dimension and the packing dimen...
In the present paper, we suggest new proofs of many known results about the relative multifractal fo...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
During the past 10 years multifractal analysis has received an enormous interest. For a sequence (ph...
We give a new inequality of the iso-Hölder set's dimension within the framework of the centered mult...
AbstractDuring the past 10 years multifractal analysis has received an enormous interest. For a sequ...
AbstractWe study the Hausdorff dimension of a large class of sets in the real line defined in terms ...
We show that there are Hilbert spaces constructed from the Hausdorff measures Hs on the real line R ...
Abstract. We study the Hausdorff dimension of a large class of sets in the real line defined in term...
In this thesis, Hausdorff, packing and capacity dimensions are studied by evaluating sets in the Euc...
AbstractLet X be a metric space and μ a Borel probability measure on X. For q, t ∈ R and E ⊆ X write...
In this article we study Cantor sets defined by monotone sequences, in the sense of Besicovich and T...
In this thesis, we consider the Hausdorff dimension of the set of points with multiple codings. In o...
AbstractThe multifractal structure of measures generated by iterated function systems (IFS) with ove...
A family of sets {F-d}(d) is said to be 'represented by the measure mu' if, for each d, the set F-d ...
Let mu be a Borel probability measure on R-d. We study the Hausdorff dimension and the packing dimen...
In the present paper, we suggest new proofs of many known results about the relative multifractal fo...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
During the past 10 years multifractal analysis has received an enormous interest. For a sequence (ph...
We give a new inequality of the iso-Hölder set's dimension within the framework of the centered mult...
AbstractDuring the past 10 years multifractal analysis has received an enormous interest. For a sequ...
AbstractWe study the Hausdorff dimension of a large class of sets in the real line defined in terms ...
We show that there are Hilbert spaces constructed from the Hausdorff measures Hs on the real line R ...
Abstract. We study the Hausdorff dimension of a large class of sets in the real line defined in term...
In this thesis, Hausdorff, packing and capacity dimensions are studied by evaluating sets in the Euc...