Add to ORKGThe middle-third Cantor set is one of the most fundamental examples of self-similar fractal sets introduced by the German mathematician George Cantor in the late 1800s. Many questions about this set remain unanswered. In this thesis, we study the mapping property of a measure associated with the middle-third Cantor set. Specifically, we study whether the Cantor measure is Lebesgue improving through partly theoretical and partly numerical methods.Science, Faculty ofMathematics, Department ofGraduat
In this article we study Cantor sets defined by monotone sequences, in the sense of Besicovich and T...
Let C be the middle third Cantor set and μ be the log 2/log 3 -dimensional Hausdorff measure restric...
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...
The middle-third Cantor set is one of the most fundamental examples of self-similar fractal sets int...
AbstractIt is shown that the arithmetic sum of middle-α Cantor sets typically has positive Lebesgue ...
Se estudian conjuntos de Cantor de medida de Lebesgue nula asociados a una sucesión no creciente, qu...
Fractal sets are irregular sets, exhibiting interesting properties. Some well-known fractal sets are...
ABSTRACT. This breif note defines the idea of a “very fat ” Cantor set, and breifly exam-ines the me...
Let \(C\) be the middle-third Cantor set. Define \(C*C=\{x*y\colon x,y\in C\}\), where \(*=+,...
For every positive, decreasing, summable sequence $a=(a_i)$, we can construct a Cantor set $C_a$ ass...
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...
Let C be the middle third Cantor set and μ be the log 2/log 3 -dimensional Hausdorff measure restric...
Abstract. We determine the constructive dimension of points in random translates of the Cantor set. ...
In this article we study Cantor sets defined by monotone sequences, in the sense of Besicovich and T...
Let C be the middle third Cantor set and μ be the log 2/log 3 -dimensional Hausdorff measure restric...
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...
The middle-third Cantor set is one of the most fundamental examples of self-similar fractal sets int...
AbstractIt is shown that the arithmetic sum of middle-α Cantor sets typically has positive Lebesgue ...
Se estudian conjuntos de Cantor de medida de Lebesgue nula asociados a una sucesión no creciente, qu...
Fractal sets are irregular sets, exhibiting interesting properties. Some well-known fractal sets are...
ABSTRACT. This breif note defines the idea of a “very fat ” Cantor set, and breifly exam-ines the me...
Let \(C\) be the middle-third Cantor set. Define \(C*C=\{x*y\colon x,y\in C\}\), where \(*=+,...
For every positive, decreasing, summable sequence $a=(a_i)$, we can construct a Cantor set $C_a$ ass...
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...
Let C be the middle third Cantor set and μ be the log 2/log 3 -dimensional Hausdorff measure restric...
Abstract. We determine the constructive dimension of points in random translates of the Cantor set. ...
In this article we study Cantor sets defined by monotone sequences, in the sense of Besicovich and T...
Let C be the middle third Cantor set and μ be the log 2/log 3 -dimensional Hausdorff measure restric...
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...