AbstractAlexandroff spaces have all the properties of finite spaces and therefore play an important role in digital topology, image analysis, and computer graphics. In this paper we study dimensions of the type dim for the class of all Alexandroff countable topological spaces using matrix algebra
The diametral dimension is an important topological invariant, especially in the context of Köthe se...
AbstractThe largest possible dimensions of linear spaces of real n×n matrices of constant rank n−1 (...
In the following text a proper subclass of Alexandroff topological spaces, namely functional Alexand...
Alexandroff spaces have all the properties of finite spaces and therefore play an important role in ...
AbstractAlexandroff spaces have all the properties of finite spaces and therefore play an important ...
Abstract. Alexandroff T0-spaces have been studied as topological models of the sup-ports of digital ...
[EN] In a relative covering dimension is defined and studied which is denoted by r-dim. In this pape...
[EN] In a relative covering dimension is defined and studied which is denoted by r-dim. In this pape...
We study some topological properties of the class of the Alexandroff duplicates and their subspaces....
In a relative covering dimension is defined and studied which is denoted by r-dim. In this paper we ...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
The "classic" diametral dimension is a topological invariant which characterizes Schwartz and nuclea...
International audienceThis paper is mainly concerned with Hausdorff dimensions of Besicovitch-Eggles...
We present the definition and the main properties of the diametral dimension. We give an application...
AbstractWe investigate a dimension function L-dim (L is a class of ANR-compacta). Main results are a...
The diametral dimension is an important topological invariant, especially in the context of Köthe se...
AbstractThe largest possible dimensions of linear spaces of real n×n matrices of constant rank n−1 (...
In the following text a proper subclass of Alexandroff topological spaces, namely functional Alexand...
Alexandroff spaces have all the properties of finite spaces and therefore play an important role in ...
AbstractAlexandroff spaces have all the properties of finite spaces and therefore play an important ...
Abstract. Alexandroff T0-spaces have been studied as topological models of the sup-ports of digital ...
[EN] In a relative covering dimension is defined and studied which is denoted by r-dim. In this pape...
[EN] In a relative covering dimension is defined and studied which is denoted by r-dim. In this pape...
We study some topological properties of the class of the Alexandroff duplicates and their subspaces....
In a relative covering dimension is defined and studied which is denoted by r-dim. In this paper we ...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
The "classic" diametral dimension is a topological invariant which characterizes Schwartz and nuclea...
International audienceThis paper is mainly concerned with Hausdorff dimensions of Besicovitch-Eggles...
We present the definition and the main properties of the diametral dimension. We give an application...
AbstractWe investigate a dimension function L-dim (L is a class of ANR-compacta). Main results are a...
The diametral dimension is an important topological invariant, especially in the context of Köthe se...
AbstractThe largest possible dimensions of linear spaces of real n×n matrices of constant rank n−1 (...
In the following text a proper subclass of Alexandroff topological spaces, namely functional Alexand...
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