Two equivalent metrics can be compared, with respect to their uniform properties, in several different ways. We present some of them, and then use one of these conditions to characterize which metrics on a space induce the same lower Hausdorff topology on the hyperspace. Finally, we focus our attention to complete metric
In this paper we study properties of metric spaces. We consider the collection of all nonempty close...
AbstractLet X be a completely regular space and ℵ an infinite cardinal number. The ℵ-uniformity of X...
This paper includes the proofs of results announced in [3], as well as other results deriving from t...
Two equivalent metrics can be compared, with respect to their uniform properties, in several differe...
Two equivalent metrics can be compared, with respect to their uniform properties, in several differe...
Abstract. Two equivalent metrics can be compared, with respect to their uniform properties, in sever...
This thesis is concerned with the properties and uses of the so-called Hausdorff uniform structure o...
Given two compatible metrics on a metrizable space X. It is well known that they give rise to the sa...
Given two compatible metrics on a metrizable space X. It is well known that they give rise to the sa...
Given two compatible metrics on a metrizable space X. It is well known that they give rise to the sa...
The ϵâmetric spaces, with ϵ a regular ordinal number, are sets equipped with a distance valued i...
The ϵâmetric spaces, with ϵ a regular ordinal number, are sets equipped with a distance valued i...
The ϵâmetric spaces, with ϵ a regular ordinal number, are sets equipped with a distance valued i...
For a given continuum a new metric on the hyperspace is defined, which is equivalent to the Hausdorf...
This paper defines the Hausdorff metric on a closed and bounded subsets compact metric space. Throug...
In this paper we study properties of metric spaces. We consider the collection of all nonempty close...
AbstractLet X be a completely regular space and ℵ an infinite cardinal number. The ℵ-uniformity of X...
This paper includes the proofs of results announced in [3], as well as other results deriving from t...
Two equivalent metrics can be compared, with respect to their uniform properties, in several differe...
Two equivalent metrics can be compared, with respect to their uniform properties, in several differe...
Abstract. Two equivalent metrics can be compared, with respect to their uniform properties, in sever...
This thesis is concerned with the properties and uses of the so-called Hausdorff uniform structure o...
Given two compatible metrics on a metrizable space X. It is well known that they give rise to the sa...
Given two compatible metrics on a metrizable space X. It is well known that they give rise to the sa...
Given two compatible metrics on a metrizable space X. It is well known that they give rise to the sa...
The ϵâmetric spaces, with ϵ a regular ordinal number, are sets equipped with a distance valued i...
The ϵâmetric spaces, with ϵ a regular ordinal number, are sets equipped with a distance valued i...
The ϵâmetric spaces, with ϵ a regular ordinal number, are sets equipped with a distance valued i...
For a given continuum a new metric on the hyperspace is defined, which is equivalent to the Hausdorf...
This paper defines the Hausdorff metric on a closed and bounded subsets compact metric space. Throug...
In this paper we study properties of metric spaces. We consider the collection of all nonempty close...
AbstractLet X be a completely regular space and ℵ an infinite cardinal number. The ℵ-uniformity of X...
This paper includes the proofs of results announced in [3], as well as other results deriving from t...
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