On the Existence of tr-Norm and tr-Conorm not in Convolution Form

Abstract

This paper constructs a tr-norm and a tr-conorm on the set of all normal and convex functions from [0, 1] to [0, 1], which are not obtained by using the following two formulas on binary operations and : (f g)(x)=\f(y) g(z) y z=x\, (f g)(x)=\f(y) g(z) y\ \ z=x\, where f, g∈ Map([0, 1], [0, 1]), and are respectively a t-norm and a t-conorm on [0, 1], and is a binary operation on [0, 1]. blueThis result answers affirmatively an open problem posed in HCT2015. Moreover, the duality between tr-norms and tr-conorms is obtained by the introduction of operations dual to binary operations on Map([0, 1], [0, 1]).