Title :
A study of the asymptotic behavior of neural networks
Author :
Dimopoulos, Nikitas J.
Author_Institution :
Dept. of Electr. & Comput. Eng., Victoria Univ., BC, Canada
fDate :
5/1/1989 12:00:00 AM
Abstract :
The stability properties are studied of neural networks modeled as a set of nonlinear differential equations of the form TX+X =Wf(X)+b where X is the neural membrane potential vector, W is the network connectivity matrix, and F(X) is the nonlinearity (an essentially sigmoid function). Topologies of neural networks that exhibit asymptotic behavior are established. This behavior depends solely on the topology of the network. Moreover, the connectivity W need not be symmetric. Networks topologically similar to the cerebellum fall in this category and exhibit asymptotic behavior. The simulated behavior of typical neural networks is presented
Keywords :
neural nets; stability; asymptotic behavior; cerebellum model; network connectivity matrix; neural membrane potential vector; neural networks; nonlinearity; set of nonlinear differential equations; stability properties; Biological neural networks; Biomembranes; Differential equations; Integrated circuit interconnections; Microscopy; Network topology; Neural networks; Neurons; Stability; Symmetric matrices;
Journal_Title :
Circuits and Systems, IEEE Transactions on
