Title :
Brain state in a convex body
Author :
Bohner, Martin ; Hui, Stefen
Author_Institution :
Abteilung Math. V, Ulm Univ., Germany
fDate :
9/1/1995 12:00:00 AM
Abstract :
We study a generalization of the brain-state-in-a-box (BSB) model for a class of nonlinear discrete dynamical systems where we allow the states of the system to lie in an arbitrary convex body. The states of the classical BSB model are restricted to lie in a hypercube. Characterizations of equilibrium points of the system are given using the support function of a convex body. Also, sufficient conditions for a point to be a stable equilibrium point are investigated. Finally, we study the system in polytopes. The results in this special case are more precise and have simpler forms than the corresponding results for general convex bodies. The general results give one approach of allowing pixels in image reconstruction to assume more than two values
Keywords :
content-addressable storage; generalisation (artificial intelligence); hypercube networks; image reconstruction; neural nets; nonlinear dynamical systems; brain-state-in-a-box model; convex body; equilibrium points; generalization; hypercube; image reconstruction; neural model; nonlinear discrete dynamical systems; polytopes; sufficient conditions; Associative memory; Brain modeling; Equations; Helium; Hypercubes; Image reconstruction; Neural networks; Pixel; Stability; Sufficient conditions;
Journal_Title :
Neural Networks, IEEE Transactions on
