Schweizer, Sklar and Thorp proved in 1960 that a Menger space $(G,D,T)$ under a continuous $t$-norm $T$, induce a natural topology $\tau$ wich is metrizable. We extend this result to any probabilistic metric space $(G,D,\star)$ provided that the triangle function $\star$ is continuous. We prove in this case, that the topological space $(G,\tau)$ is uniformly homeomorphic to a (deterministic) metric space $(G,\sigma_D)$ for some canonical metric $\sigma_D$ on $G$. As applications, we extend the fixed point theorem of Hicks to probabilistic metric spaces which are not necessarily Menger spaces and we prove a probabilistic Arzela-Ascoli type theorem
This is a presentation without proofs of the key facts about the topology of Probabilistic Metric sp...
Altres ajuts: The authors thank the reviewers for their useful comments and to University Jorge Tade...
Abstract. Here we prove a probabilistic contraction mapping principle in Menger spaces. This is in l...
Schweizer, Sklar and Thorp proved in 1960 that a Menger space $(G,D,T)$ under a continuous $t$-norm ...
Using the theory of countable exten-sion of t-norms we present some new classes of probabilistic con...
The notion of a probabilistic metric space corresponds to the situations when we do not know exactly...
We give a probabilistic generalization of the theory of generalized metric spaces [2]. Then, we prov...
AbstractOur discussion answers the questions as to what topological spaces are statistically metriza...
dedicated to Dr. Gh. Yari Abstract. We introduce the concept of r-distance on a Menger probabilistic...
Abstract. In this paper, we consider complete menger probabilistic quasimetric space and prove a com...
A Meir-Keeler type fixed point theorem for a family of mappings is proved in Menger probabilistic me...
In this paper, we investigate some common fixed point theorems in probabilistic metric spaces. Also,...
Probabilistic metric spaces are characterized as those spaces in which a suitable family of continuo...
summary:In this work, we define a partial order on probabilistic metric spaces and establish some ne...
Let (S, F) denote a probabilistic semimetric space. An induced Cauchy structure on S is shown to be ...
This is a presentation without proofs of the key facts about the topology of Probabilistic Metric sp...
Altres ajuts: The authors thank the reviewers for their useful comments and to University Jorge Tade...
Abstract. Here we prove a probabilistic contraction mapping principle in Menger spaces. This is in l...
Schweizer, Sklar and Thorp proved in 1960 that a Menger space $(G,D,T)$ under a continuous $t$-norm ...
Using the theory of countable exten-sion of t-norms we present some new classes of probabilistic con...
The notion of a probabilistic metric space corresponds to the situations when we do not know exactly...
We give a probabilistic generalization of the theory of generalized metric spaces [2]. Then, we prov...
AbstractOur discussion answers the questions as to what topological spaces are statistically metriza...
dedicated to Dr. Gh. Yari Abstract. We introduce the concept of r-distance on a Menger probabilistic...
Abstract. In this paper, we consider complete menger probabilistic quasimetric space and prove a com...
A Meir-Keeler type fixed point theorem for a family of mappings is proved in Menger probabilistic me...
In this paper, we investigate some common fixed point theorems in probabilistic metric spaces. Also,...
Probabilistic metric spaces are characterized as those spaces in which a suitable family of continuo...
summary:In this work, we define a partial order on probabilistic metric spaces and establish some ne...
Let (S, F) denote a probabilistic semimetric space. An induced Cauchy structure on S is shown to be ...
This is a presentation without proofs of the key facts about the topology of Probabilistic Metric sp...
Altres ajuts: The authors thank the reviewers for their useful comments and to University Jorge Tade...
Abstract. Here we prove a probabilistic contraction mapping principle in Menger spaces. This is in l...