Convex combinations in terms of triangular norms: A characterization of idempotent, bisymmetrical and self-dual compensatory operators

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Publication:1304218

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DOI10.1016/S0165-0114(98)00262-0zbMath0928.03063OpenAlexW1980472273MaRDI QIDQ1304218

Elena Tsiporkova, Erich Peter Klement, Bernhard A. Moser

Publication date: 22 September 1999

Published in: Fuzzy Sets and Systems (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/s0165-0114(98)00262-0

zbMATH Keywords

convex combination triangular norms idempotency cancellation law bisymmetry compensatory operators self-dual operators

Mathematics Subject Classification ID

Theory of fuzzy sets, etc. (03E72) Fuzzy sets and logic (in connection with information, communication, or circuits theory) (94D05)

Related Items (8)

Finding the numerical compensation in multiple criteria decision-making problems under fuzzy environment ⋮ On locally internal monotonic operations ⋮ Averaging operators on the unit interval ⋮ Idempotent uninorms ⋮ Unnamed Item ⋮ RET OPERATORS GENERATED BY TRIANGULAR NORMS AND COPULAS ⋮ Triangular norm-based iterative compensatory operators ⋮ A general class of triangular norm-based aggregation operators: Quasi-linear \(T-S\) operators

Cites Work

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