# Metrization of probabilistic metric spaces. Applications to fixed point   theory and Arzela-Ascoli type theorem

**Authors:** Nazaret Bruno, Mohammed Bachir, Bruno Nazaret (CEREMADE)

arXiv: 1907.05241 · 2019-07-12

## TL;DR

This paper extends the metrization of probabilistic metric spaces with continuous triangle functions, showing they are uniformly homeomorphic to metric spaces, and applies this to fixed point and Arzela-Ascoli theorems.

## Contribution

It generalizes the metrization result to all probabilistic metric spaces with continuous triangle functions and applies this to fixed point and compactness theorems.

## Key findings

- Probabilistic metric spaces with continuous triangle functions are metrizable.
- Such spaces are uniformly homeomorphic to deterministic metric spaces.
- Extended fixed point and Arzela-Ascoli theorems to probabilistic metric spaces.

## Abstract

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.

## Full text

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## References

16 references — full list in the complete paper: https://tomesphere.com/paper/1907.05241/full.md

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Source: https://tomesphere.com/paper/1907.05241