论文信息 - Testing continuous t-norm called Lukasiewicz algebra with different means in classification

Testing continuous t-norm called Lukasiewicz algebra with different means in classification

In this paper, we have done new similarity measures from a continuous t-norm by implementing it in different mean measures. For the implementation, we use a Minkowsky metric based on Lukasiewicz algebra. We test these new similarities in both the generalised and normal form of Lukasiewicz algebra with weight optimisation. The mean measures examined here are arithmetic, geometric and harmonic means. We show that the magnitude order of the similarities are S/sub H//sup N/ /spl ges/S/sub G//sup N/ /spl ges/S/sub A//sup N/ . Secondly, we show that the use of different means is highly recommendable in some cases.

Pasi Luukka | Kalle Saastamoinen

[1] Jan Pavelka,et al. On Fuzzy Logic I Many-valued rules of inference , 1979, Math. Log. Q..

[2] E. Turunen. Mathematics Behind Fuzzy Logic , 1999 .

[3] Brian D. Ripley,et al. Pattern Recognition and Neural Networks , 1996 .

[4] L. Valverde,et al. An Inquiry into Indistinguishability Operators , 1984 .

[5] C. Chang,et al. Algebraic analysis of many valued logics , 1958 .

[6] Lotfi A. Zadeh,et al. Similarity relations and fuzzy orderings , 1971, Inf. Sci..

[7] Pasi Luukka,et al. A classifier based on the maximal fuzzy similarity in the generalized Lukasiewicz-structure , 2001, 10th IEEE International Conference on Fuzzy Systems. (Cat. No.01CH37297).

[8] L. N. Stout,et al. Foundations of fuzzy sets , 1991 .