On a new class of implications: \((g,\min)\)-implications and several classical tautologies (Q2886928)

An additive generator \(g: [0, 1]\to[0,\infty]\) of a continuous and Archimedean t-conorm is a continuous, strictly increasing function with \(g(0) = 0\). In this article the author introduces a new class of fuzzy implications, called \((g,\min)\)-implications, derived from the above class of functions. A detailed study of such operations is given, where they are proven to be fuzzy implications in the sense of Fodor and Roubens. Several important properties like neutrality principle, ordering property, contrapositive symmetry and exchange principle are analyzed. This allows the author to obtain some relationships between \((g,\min)\)-implications and other known classes of fuzzy implications, like R-, S-, QL-implications and Yager's implications. Finally, the author discusses this new class of implications with respect to three classical logic tautologies, viz. law of importation, iterative Boolean-like law and distributivity over t-norms or t-conorms.