Some remarks on the metrizability of $\mathcal{F}$-metric spaces

Sumit Som; Ashis Bera; Lakshmi Kanta Dey

arXiv:1808.02736·math.FA·August 9, 2018

Some remarks on the metrizability of $\mathcal{F}$-metric spaces

Sumit Som, Ashis Bera, Lakshmi Kanta Dey

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TL;DR

This paper demonstrates that $\

Contribution

It proves that $\\mathcal{F}$-metric spaces are metrizable and that their core concepts align with those of standard metric spaces, simplifying their analysis.

Findings

01

$\\mathcal{F}$-metric spaces are metrizable.

02

Convergence, Cauchy sequences, and completeness are equivalent to those in metric spaces.

03

Banach contraction principle extends directly to $\\mathcal{F}$-metric spaces.

Abstract

In this manuscript, we claim that the newly introduced $F$ -metric space \cite[\, M.~Jleli and B.~Samet, On a new generalization of metric spaces, J. Fixed Point Theory Appl, 20(3) 2018]{JS1} is metrizable. Also, we deduce that the notions of convergence, Cauchy sequence, completeness due to Jleli and Samet for $F$ -metric spaces are equivalent with that of usual metric spaces. Moreover, we assert that the Banach contraction principle in the context of $F$ -metric spaces is a direct consequence of its standard metric counterpart.

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