Interval valued $(\alpha,\beta)$-fuzzy hyperideals in Krasner   $(m,n)$-hyperrings

M. Anbarloei

arXiv:2208.14190·math.GM·August 31, 2022

Interval valued $(\alpha,\beta)$-fuzzy hyperideals in Krasner $(m,n)$-hyperrings

M. Anbarloei

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TL;DR

This paper introduces the concept of quasicoincidence between interval-valued fuzzy sets and fuzzy points, extending the idea of quasicoincidence in fuzzy set theory within the context of Krasner hyperrings.

Contribution

It generalizes quasicoincidence to interval-valued fuzzy sets and applies this to the structure of hyperideals in Krasner hyperrings, advancing fuzzy hyperstructure theory.

Findings

01

Defined quasicoincidence for interval-valued fuzzy sets

02

Extended the concept to hyperideals in Krasner hyperrings

03

Provided theoretical framework for fuzzy hyperstructure analysis

Abstract

In this paper the notion of quasicoincidence of a fuzzy interval valued with an interval valued fuzzy set, which generalizes the concept of quasicoincidence of a fuzzy point in a fuzzy set is concentrated.

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Taxonomy

TopicsFuzzy and Soft Set Theory · Fuzzy Logic and Control Systems