Title :
Extended LaSalle’s invariance principle for full-range cellular neural networks
Author :
Marco, Mauro Di ; Forti, Mauro ; Grazzini, Massimo ; Pancioni, Luca
Author_Institution :
Dept. of Inf. Eng., Univ. of Siena, Siena
Abstract :
The paper develops a Lyapunov method, which is based on a generalized version of LaSallepsilas invariance principle, for studying convergence and stability of the differential inclusions modeling the dynamics of the full-range (FR) model of cellular neural networks (CNNs). The method is applied to yield a rigorous proof of convergence for symmetric FR-CNNs. The proof, which is a direct consequence of the fact that a symmetric FR-CNN admits a strict Lyapunov function, is much more simple than the corresponding proof of convergence for symmetric standard CNNs.
Keywords :
Lyapunov methods; cellular neural nets; invariance; set theory; Lyapunov method; extended LaSalle invariance principle; full-range cellular neural networks; strict Lyapunov function; Cellular neural networks; Convergence; Hypercubes; Lyapunov method; Mathematical model; Neurons; Stability; State-space methods; Symmetric matrices; Very large scale integration;
Conference_Titel :
Cellular Neural Networks and Their Applications, 2008. CNNA 2008. 11th International Workshop on
Conference_Location :
Santiago de Compostela
Print_ISBN :
978-1-4244-2089-6
Electronic_ISBN :
978-1-4244-2090-2
DOI :
10.1109/CNNA.2008.4588648
