Title :
Differential equations accompanying neural networks and solvable nonlinear learning machines
Author_Institution :
Res. & Dev. Center, Ricoh Co. Ltd., Yokohama, Japan
Abstract :
Solvable models of nonlinear learning machines are analyzed based on the theory of ordinary differential equations. It is shown that a function approximation neural network automatically extracts an accompanying differential equation from learning samples and that optimal parameters can be found without recursion procedures.
Keywords :
differential equations; function approximation; learning (artificial intelligence); neural nets; numerical analysis; differential equations; function approximation; neural networks; solvable nonlinear learning machines; Artificial neural networks; Data mining; Differential equations; Function approximation; Lattices; Machine learning; Mathematical model; Neural networks; Nonlinear equations; Physics;
Conference_Titel :
Neural Networks, 1993. IJCNN '93-Nagoya. Proceedings of 1993 International Joint Conference on
Print_ISBN :
0-7803-1421-2
DOI :
10.1109/IJCNN.1993.714280
