A new class of fuzzy implications derived from non associative structures and its characterizations
- Authors
- Park, Choonkil; Rehman, Noor; Ali, Abbas; Alahmadi, Reham A.; Khalaf, Mohammed M.; Hila, Kostaq
- Issue Date
- Aug-2023
- Publisher
- IOS PRESS
- Keywords
- Overlape function; grouping function; fuzzy implication; fuzzy negation
- Citation
- Journal of Intelligent & Fuzzy Systems, v.45, no.3, pp 4949 - 4977
- Pages
- 29
- Indexed
- SCIE
SCOPUS
- Journal Title
- Journal of Intelligent & Fuzzy Systems
- Volume
- 45
- Number
- 3
- Start Page
- 4949
- End Page
- 4977
- URI
- https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/196651
- DOI
- 10.3233/JIFS-222878
- ISSN
- 1064-1246
1875-8967
- Abstract
- In clasical logic, it is possible to combine the uniary negation operator ¬ with any other binary operator in order to generate the other binary operators. In this paper, we introduce the concept of (N∗, O, N, G)-implication derived from non associative structures, overlap function O, grouping function G and two different fuzzy negations N∗ and N are used for the generalization of the implication p → q ≡ ¬ [p ∧ ¬ (¬ p ∨ q)] . We show that (N∗, O, N, G)-implication are fuzzy implication without any restricted conditions. Further, we also study that some properties of (N∗, O, N, G)-implication that are necessary for the development of this paper. The key contribution of this paper is to introduced the concept of circledcircG,N-compositions on (N∗, O, N, G)-implications. If (N1∗,O(1),N1,G(1)) - or (N2∗,O(2),N2,G(2)) -implications constructed from the tuples (N1∗,O(1),N1,G(1)) or (N2∗,O(2),N2,G(2)) satisfy a certain property P, we now investigate whether circledcircG,N-composition of (N1∗,O(1),N1,G(1)) - and (N2∗,O(2),N2,G(2)) -implications satisfies the same property or not. If not, then we attempt to characterise those implications (N1∗,O(1),N1,G(1)) -, (N2∗,O(2),N2,G(2)) -implications satisfying the property P such that circledcircG,N-composition of (M1∗,O(1),M1,G(1)) - and (M2∗,O(2),M2,G(2)) -implications also satisfies the same property. Further, we introduced sup-circledcircO-composition of (N∗, O, N, G)-implications constructed from tuples (N∗, O, N, G) . Subsequently, we show that under which condition sup-circledcircO-composition of (N∗, O, N, G)-implications are fuzzy implication. We also study the intersections between families of fuzzy implications, including RO-implications (residual implication), (G, N)-implications, QL-implications, D-implications and (N∗, O, N, G)-implications.
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