Solving fuzzy equations using neural nets

This paper continues our research on using neural nets to solve fuzzy equations. After outlining our general method of employing neural nets to solve fuzzy problems we concentrate on solving the fuzzy quadratic equation. We show how neural nets can produce both real, and complex, fuzzy number soluti

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

In this paper, we first design a fuzzy neuron which possesses some generality. This fuzzy neuron is founded by replacing the operators of the traditional neuron with a pair of abstract fuzzy operators as (~, ~ ) which we call fuzzy neuron operators. For example, it may be (+, o), (A, "), (V, o), or

In our previous work (Li and Ruan, 1997) we proposed a max-min operator network and a series of training algorithms, called fuzzy rules, which could be used to solve fuzzy relation equations. The most basic and important result is the convergence theorem of fuzzy perceptron based on max-min operator