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...

詳細記述

書誌詳細
主要な著者: Juan José Font, Sergio Macario, Manuel Sanchis
フォーマット: 論文
言語:English
出版事項: MDPI AG 2024-10-01
シリーズ:Mathematics
主題:
Dini’s theorem
pointwise and uniform convergence
fuzzy-valued functions
オンライン・アクセス:https://www.mdpi.com/2227-7390/12/20/3209
その他の書誌記述
要約: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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