Abstract
The homogeneity of binary functions on the unit interval [0, 1] is a very useful property in many real practical applications. This paper studies the homogeneity of binary functions on the unit circle of the complex plane. The homogeneity is a generalization of both rotational invariance and ratio scale invariance for complex fuzzy operations. We show that a binary function is homogeneous if and only if it is both rotationally invariant and ratio scale invariant. Moreover, we consider the simplification of the homogeneity for complex fuzzy binary operators.
Funder
National Science Foundation of China
Zhejiang Provincial Natural Science Foundation
Subject
Geometry and Topology,Logic,Mathematical Physics,Algebra and Number Theory,Analysis