Title :
Treating weights as dynamical variables-a new approach to neurodynamics
Author :
Ramacher, U. ; Wesseling, M.
Author_Institution :
Siemens AG, Munich, Germany
Abstract :
The recall and learning dynamics of artificial neural networks are described by means of a partial differential equation (PDE) that may incorporate weights either as parameters or variables. For the case in which weights are interpreted as variables, a new type of neurodynamics is discovered when weights have to obey second-order differential equations called learning laws. Experiments on the association of time-varying patterns indicates the superiority of the learning law over the known types of learning rules. It is also shown that a single first-order Hamilton-Jacobi parametric PDE suffices to derive the various neurodynamical paradigms used currently
Keywords :
learning (artificial intelligence); neural nets; partial differential equations; artificial neural networks; first-order Hamilton-Jacobi parametric equation; learning dynamics; neurodynamics; partial differential equation; recall; time-varying patterns; Artificial neural networks; Boundary conditions; Differential equations; Neural networks; Neurodynamics; Neurons; Partial differential equations; Research and development; State-space methods;
Conference_Titel :
Neural Networks, 1992. IJCNN., International Joint Conference on
Conference_Location :
Baltimore, MD
Print_ISBN :
0-7803-0559-0
DOI :
10.1109/IJCNN.1992.227125
