AbstractFor a large class of Cantor sets on the real-line, we find sufficient and necessary conditions implying that a set has positive (resp. null) measure for all doubling measures of the real-line. We also discuss same type of questions for atomic doubling measures defined on certain midpoint Cantor sets
AbstractIn the following we present the most important properties of positive measures on Borel sets
Abstract. A linear Cantor set C with zero Lebesgue measure is associated with the countable collecti...
The Cantor set Ω is a rather remarkable subset of [0, 1]. It provides us with a wealth of interestin...
AbstractFor a large class of Cantor sets on the real-line, we find sufficient and necessary conditio...
We investigate doubling conditions defined in terms of measurable bounded sets and find a simple cha...
We investigate doubling conditions defined in terms of measurable bounded sets and find a simple cha...
We investigate doubling conditions defined in terms of measurable bounded sets and find a simple cha...
In this chapter we study for which Cantor sets there exists a gauge-function h, such that the h−Haus...
Cantor sets in R are common examples of sets for which Hausdorff measures can be positive and fnite....
Cantor sets in R are common examples of sets on which Hausdorff measures can be positive and finite....
AbstractIt is shown that the arithmetic sum of middle-α Cantor sets typically has positive Lebesgue ...
In this paper, the author further reveals some intrinsic properties of the Cantor set. By the proper...
In this paper, the author further reveals some intrinsic properties of the Cantor set. By the proper...
In this paper, the author further reveals some intrinsic properties of the Cantor set. By the proper...
The purpose of this paper is to explore some of the properties of the Cantor set and to extend the i...
AbstractIn the following we present the most important properties of positive measures on Borel sets
Abstract. A linear Cantor set C with zero Lebesgue measure is associated with the countable collecti...
The Cantor set Ω is a rather remarkable subset of [0, 1]. It provides us with a wealth of interestin...
AbstractFor a large class of Cantor sets on the real-line, we find sufficient and necessary conditio...
We investigate doubling conditions defined in terms of measurable bounded sets and find a simple cha...
We investigate doubling conditions defined in terms of measurable bounded sets and find a simple cha...
We investigate doubling conditions defined in terms of measurable bounded sets and find a simple cha...
In this chapter we study for which Cantor sets there exists a gauge-function h, such that the h−Haus...
Cantor sets in R are common examples of sets for which Hausdorff measures can be positive and fnite....
Cantor sets in R are common examples of sets on which Hausdorff measures can be positive and finite....
AbstractIt is shown that the arithmetic sum of middle-α Cantor sets typically has positive Lebesgue ...
In this paper, the author further reveals some intrinsic properties of the Cantor set. By the proper...
In this paper, the author further reveals some intrinsic properties of the Cantor set. By the proper...
In this paper, the author further reveals some intrinsic properties of the Cantor set. By the proper...
The purpose of this paper is to explore some of the properties of the Cantor set and to extend the i...
AbstractIn the following we present the most important properties of positive measures on Borel sets
Abstract. A linear Cantor set C with zero Lebesgue measure is associated with the countable collecti...
The Cantor set Ω is a rather remarkable subset of [0, 1]. It provides us with a wealth of interestin...
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