The \(R_0\)-type fuzzy logic metric space and an algorithm for solving fuzzy modus ponens
From MaRDI portal
Publication:2483068
DOI10.1016/j.camwa.2007.04.050zbMath1138.03316OpenAlexW2008797076MaRDI QIDQ2483068
Jian-She Song, Xiaojing Hui, Wang, Guojun
Publication date: 5 May 2008
Published in: Computers \& Mathematics with Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.camwa.2007.04.050
continuityfuzzy reasoningfuzzy modus ponensfuzzy pseudo-metric space\(R_{0}\)-operatorsystem L\(^{\ast}\)
Fuzzy logic; logic of vagueness (03B52) Reasoning under uncertainty in the context of artificial intelligence (68T37)
Related Items (3)
Generalized Bosbach states. II ⋮ STONE DUALITY FOR R0-ALGEBRAS WITH INTERNAL STATES ⋮ The generalized truth degree of quantitative logic in the logic system \(\mathcal L_n^*\) (\(n\)-valued NM-logic system)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A universal theory of measure and integral on valuation spaces with respect to diverse implication operators
- Metamathematics of fuzzy logic
- Monoidal t-norm based logic: Towards a logic for left-continuous t-norms
- A formal deductive system for fuzzy propositional calculus
- On equivalent forms of fuzzy logic systems NM and IMTL
- How to construct left-continuous triangular norms -- state of the art.
- Non-fuzzy versions of fuzzy reasoning in classical logics
- Integrated semantics and logic metric spaces
- On the logic foundation of fuzzy reasoning
- Fuzzy logic and the calculi of fuzzy rules, fuzzy graphs, and fuzzy probabilities
- Similarity relations, fuzzy partitions, and fuzzy orderings
- Unified forms of Triple I method
- Similarity relations and fuzzy orderings
- Fuzzy sets in a approximate reasoning. I: Inference with possibility distributions
- A logic for approximate reasoning
- Outline of a New Approach to the Analysis of Complex Systems and Decision Processes
This page was built for publication: The \(R_0\)-type fuzzy logic metric space and an algorithm for solving fuzzy modus ponens
