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Order-equivalent triangular norms
Fuzzy Sets and Systems, 2015zbMATH Open Web Interface contents unavailable due to conflicting licenses.
M. Nesibe Kesicioglu +2 more
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A note on the continuity of triangular norms
Fuzzy Sets and Systems, 2014zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zhiqiang Shen, Dexue Zhang
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Fuzzy Sets and Systems, 1999
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On continuous triangular norms that are migrative
Fuzzy Sets and Systems, 2007A triangular norm (t-norm for short) \(T\colon [0,1]^2\to [0,1]\) is said to be \(\alpha\)-migrative, for some \(\alpha\) in \(]0,1[\), if \(T(\alpha x,y)=T(x,\alpha y)\) for all \(x,y\) in \([0,1]\). In this paper, the authors investigate the class of all continuous t-norms that are \(\alpha\)-migrative for some \(\alpha\) in \(]0,1[\), and, in ...
János C. Fodor, Imre J. Rudas
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Information Sciences, 2009
A triangular norm \(T\) (a non-decreasing commutative associative binary operation on \([0,1]\) with neutral element \(e= 1\)) is extended to act on fuzzy truth values (special fuzzy subsets of \([0,1]\)) based on a (possibly different) t-norm \(T_*\).
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A triangular norm \(T\) (a non-decreasing commutative associative binary operation on \([0,1]\) with neutral element \(e= 1\)) is extended to act on fuzzy truth values (special fuzzy subsets of \([0,1]\)) based on a (possibly different) t-norm \(T_*\).
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An answer to an open problem on triangular norms
Information Sciences, 2005zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yao Ouyang, Jun Li 0014
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Problems on triangular norms and related operators
Fuzzy Sets and Systems, 2004zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Erich-Peter Klement +2 more
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A family of strict and discontinuous triangular norms
Fuzzy Sets and Systems, 1998zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Budinčević, Mirko, Kurilić, Miloš
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Supermigrative semi-copulas and triangular norms
Information Sciences, 2009zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Durante F, Ghiselli-Ricci R
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Semi-divisible triangular norms
Soft Computing, 2007Let \(\odot\) be a left-continuous t-norm, \(\rightarrow\) the corresponding residuum, and \(n\) the corresponding residual negation; then \(\odot\) is called semi-divisible [\textit{E. Turunen} and \textit{J. Mertanen}, Soft Comput. 12, No.~4, 353--357 (2008; Zbl 1138.06006)] if \((a \rightarrow b) \rightarrow b = (b \rightarrow a) \rightarrow a ...
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