DocumentCode
814559
Title
Some extensions of a new method to analyze complete stability of neural networks
Author
Forti, Mauro
Author_Institution
Dipt. di Ingegneria dell´´Informazione, Siena Univ., Italy
Volume
13
Issue
5
fYear
2002
fDate
9/1/2002 12:00:00 AM
Firstpage
1230
Lastpage
1238
Abstract
In a recent work, a new method has been introduced to analyze complete stability of the standard symmetric cellular neural networks (CNNs), which are characterized by local interconnections and neuron activations modeled by a three-segment piecewise-linear (PWL) function. By complete stability it is meant that each trajectory of the neural network converges toward an equilibrium point. The goal of this paper is to extend that method in order to address complete stability of the much wider class of symmetric neural networks with an additive interconnecting structure where the neuron activations are general PWL functions with an arbitrary number of straight segments. The main result obtained is that complete stability holds for any choice of the parameters within the class of symmetric additive neural networks with PWL neuron activations, i.e., such a class of neural networks enjoys the important property of absolute stability of global pattern formation. It is worth pointing out that complete stability is proved for generic situations where the neural network has finitely many (isolated) equilibrium points, as well as for degenerate situations where there are infinite (nonisolated) equilibrium points. The extension in this paper is of practical importance since it includes neural networks useful to solve significant signal processing tasks (e.g., neural networks with multilevel neuron activations). It is of theoretical interest too, due to the possibility of approximating any continuous function (e.g., a sigmoidal function), using PWL functions. The results in this paper confirm the advantages of the method of Forti and Tesi, with respect to LaSalle approach, to address complete stability of PWL neural networks.
Keywords
cellular neural nets; piecewise linear techniques; stability; PWL neural networks; complete stability; equilibrium point; neural network; neuron activations; piecewise-linear function; stability; symmetric cellular neural networks; Additives; Cellular neural networks; Hopfield neural networks; Image processing; Neural networks; Neurons; Nonlinear dynamical systems; Piecewise linear techniques; Signal processing; Stability analysis;
fLanguage
English
Journal_Title
Neural Networks, IEEE Transactions on
Publisher
ieee
ISSN
1045-9227
Type
jour
DOI
10.1109/TNN.2002.1031956
Filename
1031956
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