Add to ORKGSummary. We introduce the equivalence classes in a pseudometric space. Next we prove that the set of the equivalence classes forms the metric space with the special metric defined in the article
Summary. In this paper we define the metric spaces. Two examples of metric spaces are given. We defi...
AbstractThe standard 4-dimensional Minkowski space–time of special relativity is based on the 3-dime...
We introduce the notion of -metric as a generalization of a metric by replacing the triangle inequal...
Summary. We introduce the equivalence classes in a pseudometric space. Next we prove that the set of...
It is well-known that a metric space $(X, d)$ is complete iff the set $X$ is closed in every metric ...
summary:This paper considers certain pseudometric structures on Ext-semigroups and gives a unified c...
summary:This paper considers certain pseudometric structures on Ext-semigroups and gives a unified c...
summary:This paper considers certain pseudometric structures on Ext-semigroups and gives a unified c...
Abstract. Let ρ be a metric on a space X and let s≥1. The function ρs(a, b) = ρ(a, b)s is a quasimet...
Abstract. Let ρ be a metric on a space X and let s≥1. The function ρs(a, b) = ρ(a, b)s is a quasimet...
This talk is based on the reference [B&]. We are used to the following definition: 1 Definition....
We discuss completeness in terms of a notion of absolute closure. This will be done in the context o...
AbstractThis paper contains a preliminary study of a class of spaces that can be seen as special cas...
summary:We show: (i) The countable axiom of choice $\mathbf{CAC}$ is equivalent to each one of the ...
In this paper, we characterize local pre-Hausdorff extended pseudo-quasi-semi metric spaces and inve...
Summary. In this paper we define the metric spaces. Two examples of metric spaces are given. We defi...
AbstractThe standard 4-dimensional Minkowski space–time of special relativity is based on the 3-dime...
We introduce the notion of -metric as a generalization of a metric by replacing the triangle inequal...
Summary. We introduce the equivalence classes in a pseudometric space. Next we prove that the set of...
It is well-known that a metric space $(X, d)$ is complete iff the set $X$ is closed in every metric ...
summary:This paper considers certain pseudometric structures on Ext-semigroups and gives a unified c...
summary:This paper considers certain pseudometric structures on Ext-semigroups and gives a unified c...
summary:This paper considers certain pseudometric structures on Ext-semigroups and gives a unified c...
Abstract. Let ρ be a metric on a space X and let s≥1. The function ρs(a, b) = ρ(a, b)s is a quasimet...
Abstract. Let ρ be a metric on a space X and let s≥1. The function ρs(a, b) = ρ(a, b)s is a quasimet...
This talk is based on the reference [B&]. We are used to the following definition: 1 Definition....
We discuss completeness in terms of a notion of absolute closure. This will be done in the context o...
AbstractThis paper contains a preliminary study of a class of spaces that can be seen as special cas...
summary:We show: (i) The countable axiom of choice $\mathbf{CAC}$ is equivalent to each one of the ...
In this paper, we characterize local pre-Hausdorff extended pseudo-quasi-semi metric spaces and inve...
Summary. In this paper we define the metric spaces. Two examples of metric spaces are given. We defi...
AbstractThe standard 4-dimensional Minkowski space–time of special relativity is based on the 3-dime...
We introduce the notion of -metric as a generalization of a metric by replacing the triangle inequal...