Title :
The fractal geometry of backpropagation
Author_Institution :
Fachbereich Math. und Inf., Freie Univ. Berlin, Germany
fDate :
27 Jun-2 Jul 1994
Abstract :
It is empirically known that standard backpropagation is very sensitive to the initial learning rate chosen for a given learning task. In this paper the author examines the shape of the iteration path for the training of a linear associator using backpropagation with momentum and online backpropagation. In the first case the path resembles Lisajous figures, in the second it is a fractal in weight space. The specific form depends on the learning rate chosen, but there is a threshold value for which the attractor of the iteration path is dense in a region of weight space around a local minimum of the error function. This result also yields a deeper insight into the mechanics of the iteration process in the nonlinear case
Keywords :
backpropagation; fractals; geometry; neural nets; Lisajous figures; attractor; error function; fractal geometry; initial learning rate; iteration path; learning task; linear associator; momentum; online backpropagation; Backpropagation; Computer graphics; Extraterrestrial measurements; Feedforward neural networks; Feedforward systems; Fractals; Geometry; Learning systems; Neural networks; Shape;
Conference_Titel :
Neural Networks, 1994. IEEE World Congress on Computational Intelligence., 1994 IEEE International Conference on
Conference_Location :
Orlando, FL
Print_ISBN :
0-7803-1901-X
DOI :
10.1109/ICNN.1994.374167
