Title :
Stagewise Newton, differential dynamic programming, and neighboring optimum control for neural-network learning
Author :
Mizutani, Eiji ; Dreyfus, Stuart E.
Author_Institution :
Dept. of Comput. Sci., Nat. Tsing Hua Univ., Hsinchu, China
Abstract :
The theory of optimal control is applied to multi-stage (i.e., multiple-layered) neural-network (NN) learning for developing efficient second-order algorithms, expressed in NN notation. In particular, we compare differential dynamic programming, neighboring optimum control, and stagewise Newton methods. Understanding their strengths and weaknesses would prove useful in pursuit of an effective intermediate step between the steepest descent and the Newton directions, arising in supervised NN-learning as well as reinforcement learning with function approximators.
Keywords :
Newton method; control system analysis; dynamic programming; function approximation; learning (artificial intelligence); neural nets; optimal control; differential dynamic programming; function approximators; multi-stage neural network; multiple-layered neural-network; neighboring optimum control; optimal control theory; reinforcement learning; second-order algorithms; stagewise Newton method; supervised NN-learning; Boundary conditions; Costs; Difference equations; Dynamic programming; Lagrangian functions; Learning; Neural networks; Newton method; Optimal control; Performance analysis;
Conference_Titel :
American Control Conference, 2005. Proceedings of the 2005
Print_ISBN :
0-7803-9098-9
Electronic_ISBN :
0743-1619
DOI :
10.1109/ACC.2005.1470149
