The generalized modus ponens and the triangular fuzzy data model

In this paper a modification of the generalized modus ponens is presented, namely, rule: if X is bB then Y is cC; fact: X is aB, conclusion: Y is dC where a, b, c, e, and d are linguistic hedges, and B, C are fuzzy sets. The procedure that allows one to evaluate the modifier d is very simple and giv

Fuzzy modus ponens (briefly, FMP) is the most fundamental form of fuzzy reasoning and has been extensively discussed by diverse researchers. The aim of the present paper is to propose a formalized form of FMP, called generalized modus ponens, in the fuzzy logic system L \* and solve it in L \* , and

Fuzzy rule bases have proven to be an e ective tool for modeling complex systems and approximating functions. Two approaches, global and local rule generation, have been identiÿed for the evolutionary generation of fuzzy models. In the global approach, the standard method of employing evolutionary t

Lindström (Theoria, 1966; 32:186-195) introduced a very powerful notion of quantifiers, which permits multiplace quantification and the simultaneous binding of several variables. "Branching" quantification was found to be useful by linguists, e.g., for modeling reciprocal constructions like "Most me

The conventional method of analysis of a data-set of this type starts with the formulation of some, bypothgie r e g q r w g ,$he mechanissl by which %bles ofthe tspe in Figure are generated. Some probability model is implicit or explicit in this hypothesis and this allows the evaluation of the poss