Title :
On the conditions of outer-supervised feedforward neural networks for null cost learning
Author :
Huang, De-Shuang
Author_Institution :
Beijing Inst. of Syst. Eng., China
Abstract :
This paper investigates, from the viewpoint of linear algebra, the local minima of least square error cost functions defined at the outputs of outer-supervised feedforward neural networks (FNN). For a specific case, we also show that those spacedly colinear samples (probably output by the final hidden layer) will be easily separated with null-cost error function even if the condition M⩾N is not satisfied. In the light of these conclusions we shall give a general method for designing a suitable architecture network to solve a specific problem
Keywords :
feedforward neural nets; learning (artificial intelligence); least squares approximations; linear algebra; FNN; least square error cost functions; linear algebra; local minima; neural network architecture design; null cost learning; null-cost error function; outer-supervised feedforward neural networks; spacedly colinear samples; Cost function; Feedforward neural networks; Least squares methods; Linear algebra; Neural networks; Neurons; Pattern recognition; Sufficient conditions; Systems engineering and theory; Transfer functions;
Conference_Titel :
Neural Networks, 1999. IJCNN '99. International Joint Conference on
Conference_Location :
Washington, DC
Print_ISBN :
0-7803-5529-6
DOI :
10.1109/IJCNN.1999.831061
