Fuzzy regression analysis using neural networks

In this paper, ÿrst we explain several versions of fuzzy regression methods based on linear fuzzy models with symmetric triangular fuzzy coe cients. Next we point out some limitations of such fuzzy regression methods. Then we extend the symmetric triangular fuzzy coe cients to asymmetric triangular

In this paper, we describe a method for nonlinear fuzzy regression using neural network models. In earlier work, strong assumptions were made on the form of the fuzzy number parameters: symmetric triangular, asymmetric triangular, quadratic, trapezoidal, and so on. Our goal here is to substantially

As a very important tool for dealing with both crisp data and fuzzy data, fuzzy regression analysis based on interval regression analysis has become an active area of research. Some neural network related methods for nonlinear interval regression analysis have been proposed on the assumption that gi

## a b s t r a c t In this paper, a novel hybrid method based on fuzzy neural network for approximate fuzzy coefficients (parameters) of fuzzy linear and nonlinear regression models with fuzzy output and crisp inputs, is presented. Here a neural network is considered as a part of a large field call

Neural networks can only be trained with a crisp and finite data set. Therefore, the approximation quality of a trained network is hard to verify. So, a common way in proving stability of a trained neural net controller is to demonstrate the existence of a Lyapunov function. In this article we propo