论文信息 - Smooth associative operations on finite ordinal scales

Smooth associative operations on finite ordinal scales

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.

János C. Fodor | J. Fodor

[1] C. Sierra,et al. A new approach to connective generation in the framework of expert systems using fuzzy logic , 1988, [1988] Proceedings. The Eighteenth International Symposium on Multiple-Valued Logic.

[2] János Fodor,et al. Aggregation Functions Defined by t-Norms and t-Conorms , 1998 .

[3] Joan Torrens,et al. On a class of operators for expert systems , 1993, Int. J. Intell. Syst..

[4] Jean-Luc Marichal,et al. On the associativity functional equation , 2000, Fuzzy Sets Syst..

[5] G. Mayor,et al. t‐Operators and uninorms on a finite totally ordered set , 1999 .

[6] János C. Fodor,et al. An Extension of Fung-Fu's Theorem , 1996, Int. J. Uncertain. Fuzziness Knowl. Based Syst..

[7] Tomasa Calvo Sánchez,et al. Idempotent operators on a finite chain , 1999 .

[8] K. S. Fu,et al. AN AXIOMATIC APPROACH TO RATIONAL DECISION MAKING IN A FUZZY ENVIRONMENT , 1975 .

[9] Bernard De Baets,et al. The functional equations of Frank and Alsina for uninorms and nullnorms , 2001, Fuzzy Sets Syst..

[10] Ronald R. Yager,et al. Non-numeric multi-criteria multi-person decision making , 1993 .