Constructing membership functions using statistical data

In many applications of fuzzy logic it is of special interest to have a transfer function with good properties regarding differentiability. To that end it is desirable to have continuously differentiable membership functions with only few parameters. In this paper we propose a class of symmetrical a

In this paper, we study the semantics of fuzzy sets. We show that fuzzy sets can be interpreted as the aggregation of a set of observations. We formalize this interpretation by means of the OWA and the WOWA operators. The introduction of the WOWA operator allows the user to weigh each observation.

## Abstract Component models available in CAD software do not consider the statistical variation and the layout‐ or package‐specific parasitic effects of components. Because of the complexity of device packages, the well‐established EM simulation alternative can only be applied to relatively simple

In almost every work on fuzzy sets, the existence of membership functions taking part in the considered model is assumed and it is not studied in depth whether or not such functions exist. On the other hand, generally the relationship between a certain studied characteristic and its referential set

For the classification problem, of which categories having vague or verbal definition, Okuda et al. [Proc. 3rd IFSA Congr. (1989) 755] proposed a model in which each category is defined by fuzzy sets, and each appearance frequency is explained by the probability of Zadeh's fuzzy event. They called t