Title :
Stability analysis on a class of nonlinear continuous neural networks
Author :
Chen, Zhong-Yu ; Xu, Zong-Ben
Author_Institution :
Dept. of Inf. Eng., Chinese Univ. of Hong Kong, Shatin, Hong Kong
fDate :
27 Jun-2 Jul 1994
Abstract :
The global convergence of neural networks is known to be the basis of successful applications of neural networks in various computation and recognition tasks. However, almost all the previous studies on neural networks assumed that the interconnection matrix is symmetric. In this paper, we investigate the sufficient condition to guarantee a class of nonlinear continuous neural networks including the Hopfield model as a special case to be global convergent towards unique stable equilibrium point without the assumption of symmetric interconnection. And we also give the sufficient condition to ensure the global convergence of the networks with symmetric interconnection matrix
Keywords :
convergence of numerical methods; matrix algebra; neural nets; stability; Hopfield model; global convergence; nonlinear continuous neural networks; stability; stable equilibrium point; sufficient condition; symmetric interconnection matrix; Associative memory; CADCAM; Computer aided manufacturing; Computer networks; Convergence; Hopfield neural networks; Neural networks; Stability analysis; Sufficient conditions; Symmetric matrices;
Conference_Titel :
Neural Networks, 1994. IEEE World Congress on Computational Intelligence., 1994 IEEE International Conference on
Conference_Location :
Orlando, FL
Print_ISBN :
0-7803-1901-X
DOI :
10.1109/ICNN.1994.374323
