Publication date
February 2006
DOI Publisher
Elsevier GmbH. ISSN
0723-0869 Citation count (estimate)
48Abstract
AbstractThis is an attempt to give a systematic survey of properties of the famous Cantor ternary function
AbstractThis is an attempt to give a systematic survey of properties of the famous Cantor ternary function
The aim of this paper is to construct general Cantor like sets in two dimensional space R^2 and thre...
Cataloged from PDF version of article.Smoothness of the Green functions for the complement of rarefi...
For every positive, decreasing, summable sequence $a=(a_i)$, we can construct a Cantor set $C_a$ ass...
AbstractThis is an attempt to give a systematic survey of properties of the famous Cantor ternary fu...
This paper is a summary of some interesting properties of the Cantor ternary set and a few investig...
ABSTRACT. In this paper we discuss several variations and generalizations of the Cantor set and stud...
The Cantor set Ω is a rather remarkable subset of [0, 1]. It provides us with a wealth of interestin...
The Fibonacci sequence and Cantor\u27s ternary set are two objects of study in mathematics. There is...
The present paper discusses some aspects of the role of the Cantor set in probability theory. It con...
This thesis covers the Cantor Ternary Set and generalizations of the Cantor Set, and gives a complet...
ABSTRACT. The ternary Cantor setC, constructed by George Cantor in 1883, is probably the best known ...
Properties of Cantor function Author: Martin Fiala Supervisor: Stanislav Hencl Abstract: In the pres...
Georg Cantor (1845-1919), with his seminal work on sets and number, brought forth a new field of in...
Paul R. Halmos - Lester R. Ford Award http://www.maa.org/programs/maa-awards/writing-awards/paul-hal...
At the heart of mathematics is the quest to find patterns and order in some set of similar structures...
The aim of this paper is to construct general Cantor like sets in two dimensional space R^2 and thre...
Cataloged from PDF version of article.Smoothness of the Green functions for the complement of rarefi...
For every positive, decreasing, summable sequence $a=(a_i)$, we can construct a Cantor set $C_a$ ass...
AbstractThis is an attempt to give a systematic survey of properties of the famous Cantor ternary fu...
This paper is a summary of some interesting properties of the Cantor ternary set and a few investig...
ABSTRACT. In this paper we discuss several variations and generalizations of the Cantor set and stud...
The Cantor set Ω is a rather remarkable subset of [0, 1]. It provides us with a wealth of interestin...
The Fibonacci sequence and Cantor\u27s ternary set are two objects of study in mathematics. There is...
The present paper discusses some aspects of the role of the Cantor set in probability theory. It con...
This thesis covers the Cantor Ternary Set and generalizations of the Cantor Set, and gives a complet...
ABSTRACT. The ternary Cantor setC, constructed by George Cantor in 1883, is probably the best known ...
Properties of Cantor function Author: Martin Fiala Supervisor: Stanislav Hencl Abstract: In the pres...
Georg Cantor (1845-1919), with his seminal work on sets and number, brought forth a new field of in...
Paul R. Halmos - Lester R. Ford Award http://www.maa.org/programs/maa-awards/writing-awards/paul-hal...
At the heart of mathematics is the quest to find patterns and order in some set of similar structures...
The aim of this paper is to construct general Cantor like sets in two dimensional space R^2 and thre...
Cataloged from PDF version of article.Smoothness of the Green functions for the complement of rarefi...
For every positive, decreasing, summable sequence $a=(a_i)$, we can construct a Cantor set $C_a$ ass...
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