Convexly combined fuzzy relational equations and several aspects of their application to fuzzy information processing

Abstract

This paper presents some theoretical results on a set of the convexly combined fuzzy relational equations represented in the form λ·( x ( k) Δ 2)+ − λ· ( x ( k) · R) = y ( k) ( k = 1,2,…, K), where x k and y k denote fuzzy sets, R and 2 fuzzy relations, · the sup · min compositional operator, Δ the inf · max one, and λ a fuzzy convex combinator whose complement is −λ. Furthermore, we propose a method to formulate the fuzzy information processing approximately by means of the convexly combined fuzzy relational equations, focusing our attention on the modeling of fuzzy input-output systems, normality of fuzzy sets characterizing fuzzy input, fuzzy logical aspects of systems, and association between fuzzy information. Finally, it is suggested that the proposed method is suitable for the modelling of several types of fuzzy systems.