Dini’s Theorem for Fuzzy Number-Valued Continuous Functions

Dini’s Theorem for Fuzzy Number-Valued Continuous Functions

This work aims to provide several versions of Dini’s theorem for fuzzy number-valued continuous functions defined on a compact set <i>K</i>. In this context, there is a wide variety of possibilities since, unlike the real line, we can consider different topologies and orders on the set o...

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Détails bibliographiques
Auteurs principaux: Juan José Font, Sergio Macario, Manuel Sanchis
Format: Article
Langue:English
Publié: MDPI AG 2024-10-01
Collection:Mathematics
Sujets:
Dini’s theorem
pointwise and uniform convergence
fuzzy-valued functions
Accès en ligne:https://www.mdpi.com/2227-7390/12/20/3209
Description
Résumé:This work aims to provide several versions of Dini’s theorem for fuzzy number-valued continuous functions defined on a compact set <i>K</i>. In this context, there is a wide variety of possibilities since, unlike the real line, we can consider different topologies and orders on the set of fuzzy numbers. For example, we will show that the fuzzy Dini’s theorem holds for the usual partial orders and the most commonly used topologies but does not hold for all orders in general.
ISSN:2227-7390

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