T-superiority and t-norm-based images of fuzzy sets
Abstract
Comparisons of finite fuzzy sets based on the results of conjunctive and disjunctive aggregations of their membership grades are studied.
For a given t-norm $T$, the notion of $T$-superiority of fuzzy sets is introduced. When a fuzzy set $g$ is $T$-superior to a fuzzy set $f$, the description of a vague concept by $g$ is much more desirable than the description by $f$.
For a comparison of a fuzzy set $f$ with the ``standard'' fuzzy set $g$ (describing the desirable or historically the most common characterization of the vague concept in question) t-norm-based transformations of $f$ with respect to $g$, called the $T$-images of $f$, are suggested. A special type of the $T$-image of $f$ with respect to $g$ may be considered as a soft evaluation of $T$-superiority of $g$ to $f$.
For a given t-norm $T$, the notion of $T$-superiority of fuzzy sets is introduced. When a fuzzy set $g$ is $T$-superior to a fuzzy set $f$, the description of a vague concept by $g$ is much more desirable than the description by $f$.
For a comparison of a fuzzy set $f$ with the ``standard'' fuzzy set $g$ (describing the desirable or historically the most common characterization of the vague concept in question) t-norm-based transformations of $f$ with respect to $g$, called the $T$-images of $f$, are suggested. A special type of the $T$-image of $f$ with respect to $g$ may be considered as a soft evaluation of $T$-superiority of $g$ to $f$.
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Subscribers OnlyDOI: https://doi.org/10.2478/tatra.v66i0.438