Title :
Smooth associative operations on finite ordinal scales
Author_Institution :
Dept. of Biomath. & Inf., Szent Istvan Univ., Budapest, Hungary
fDate :
12/1/2000 12:00:00 AM
Abstract :
An intuitive notion of smoothness introduced by Godo et al. (1988) on finite chains is investigated and formulated in a more useful mathematical way. By the help of this equivalent form, which is the intermediate-value theorem, we completely characterize a class of smooth associative, increasing binary operations on a chain that also satisfy weak boundary conditions. Some important subclasses of such operations are also described
Keywords :
computational linguistics; fuzzy logic; fuzzy set theory; process algebra; associative binary operations; equivalent form; finite ordinal scales; fuzy set theory; intermediate-value theorem; null norm; smoothness; uninorm; weak boundary conditions; Boundary conditions; Fuzzy control; Fuzzy sets; Informatics; Psychology; Terminology;
Journal_Title :
Fuzzy Systems, IEEE Transactions on
