AbstractWe consider a natural way of extending the Lebesgue covering dimension to various classes of infinite dimensional topological groups. The dimension function that we introduce extends Lebesgue covering dimension, has the hereditary property, and has a product theory that is more similar to the product theory for the finite dimensional case
We present results on the relationships of the covering property GΦΨ for Φ,Ψ∈OΛΩΓ and G∈S1SfinUfin o...
AbstractWe give necessary and sufficient conditions for a topological group to be homeomorphic to a ...
AbstractThe most general subset theorem for the covering dimension for arbitrary topological spaces ...
We consider a natural way of extending the Lebesgue covering dimension to various classes of infini...
We consider a natural way of extending the Lebesgue covering dimension to various classes of infini...
AbstractWe consider a natural way of extending the Lebesgue covering dimension to various classes of...
AbstractWe develop a covering group theory for a large category of “coverable” topological groups, w...
Abstract. We consider a natural way of extending the Lebesgue covering dimension to various classes ...
Abstract. We consider a natural way of extending the Lebesgue covering dimension to various classes ...
summary:Using certain ideas connected with the entropy theory, several kinds of dimensions are intro...
AbstractWe present a covering group theory (with a generalized notion of cover) for the category of ...
summary:We prove a general theorem about preservation of the covering dimension $\operatorname{dim}$...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
Abstract. In this paper, I will briefly develop the theory of fundamental groups and covering spaces...
P. Borst introduced a transfinite extension of the covering dimension. In this paper we obtain compa...
We present results on the relationships of the covering property GΦΨ for Φ,Ψ∈OΛΩΓ and G∈S1SfinUfin o...
AbstractWe give necessary and sufficient conditions for a topological group to be homeomorphic to a ...
AbstractThe most general subset theorem for the covering dimension for arbitrary topological spaces ...
We consider a natural way of extending the Lebesgue covering dimension to various classes of infini...
We consider a natural way of extending the Lebesgue covering dimension to various classes of infini...
AbstractWe consider a natural way of extending the Lebesgue covering dimension to various classes of...
AbstractWe develop a covering group theory for a large category of “coverable” topological groups, w...
Abstract. We consider a natural way of extending the Lebesgue covering dimension to various classes ...
Abstract. We consider a natural way of extending the Lebesgue covering dimension to various classes ...
summary:Using certain ideas connected with the entropy theory, several kinds of dimensions are intro...
AbstractWe present a covering group theory (with a generalized notion of cover) for the category of ...
summary:We prove a general theorem about preservation of the covering dimension $\operatorname{dim}$...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
Abstract. In this paper, I will briefly develop the theory of fundamental groups and covering spaces...
P. Borst introduced a transfinite extension of the covering dimension. In this paper we obtain compa...
We present results on the relationships of the covering property GΦΨ for Φ,Ψ∈OΛΩΓ and G∈S1SfinUfin o...
AbstractWe give necessary and sufficient conditions for a topological group to be homeomorphic to a ...
AbstractThe most general subset theorem for the covering dimension for arbitrary topological spaces ...
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