An algebraic study of Peterson's intermediate syllogisms
From MaRDI portal
Publication:894314
DOI10.1007/S00500-013-1216-2zbMath1330.03065OpenAlexW1969882446MaRDI QIDQ894314
Publication date: 30 November 2015
Published in: Soft Computing (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00500-013-1216-2
Related Items (4)
A new algorithmic decision for categorical syllogisms via Carroll's diagrams ⋮ An algebraic analysis of categorical syllogisms by using Carroll’s diagrams ⋮ A novel algorithmic construction for deductions of categorical polysyllogisms by Carroll's diagrams ⋮ The theory of intermediate quantifiers in fuzzy natural logic revisited and the model of ``many
Cites Work
- Unnamed Item
- A formal theory of generalized intermediate syllogisms
- A formal theory of intermediate quantifiers
- A computational approach to fuzzy quantifiers in natural languages
- Mathematics behind fuzzy logic
- On the logic of few, many, and most
- Metamathematics of fuzzy logic
- Traffic signal control on similarity logic reasoning.
- Vagueness: where degree-based approaches are useful, and where we can do without
- On a generalization of quantifiers
- On Fuzzy Logic I Many‐valued rules of inference
- Many-Valued Similarity Reasoning. An Axiomatic Approach
This page was built for publication: An algebraic study of Peterson's intermediate syllogisms
