Identificador para citar o enlazar este ítem: http://hdl.handle.net/20.500.13003/18549
On Principal Fuzzy Metric Spaces
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DOI: 10.3390/math10162860
eISSN: 2227-7390
WOS ID: 000845457300001
Scopus EID: 2-s2.0-85137389816
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2022Tipo de documento
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Gregori V, Miñana J-J, Morillas S, Sapena A. On Principal Fuzzy Metric Spaces. Mathematics. 2022 Aug 11;10(16):2860.Resumen
In this paper, we deal with the notion of fuzzy metric space (X,M,∗), or simply X, due to George and Veeramani. It is well known that such fuzzy metric spaces, in general, are not completable and also that there exist p-Cauchy sequences which are not Cauchy. We prove that if every p-Cauchy sequence in X is Cauchy, then X is principal, and we observe that the converse is false, in general. Hence, we introduce and study a stronger concept than principal, called strongly principal. Moreover, X is called weak p-complete if every p-Cauchy sequence is p-convergent. We prove that if X is strongly principal (or weak p-complete principal), then the family of p-Cauchy sequences agrees with the family of Cauchy sequences. Among other results related to completeness, we prove that every strongly principal fuzzy metric space where M is strong with respect to an integral (positive) t-norm ∗ admits completion.