Title :
The unreasonable effectiveness of neural network approximation
Author :
Dingankar, Ajit T.
Author_Institution :
Intel Corp., Folsom, CA, USA
fDate :
11/1/1999 12:00:00 AM
Abstract :
Results concerning the approximation rates of neural networks are of particular interest to engineers. The results reported in the literature have “slow approximation rates” O(1/√m), where m is the number of parameters in the neural network. However, many empirical studies report that neural network approximation is quite effective in practice. We give an explanation of this unreasonable effectiveness by proving the existence of approximation schemes that converge at a rate of the order of 1/m2 by using methods from number theory
Keywords :
approximation theory; convergence of numerical methods; neural nets; number theory; approximation rates; convergence; neural network approximation; number theory; rational approximation; Approximation algorithms; Arithmetic; Computational efficiency; Convergence; Function approximation; Neural networks; Signal processing; Signal processing algorithms;
Journal_Title :
Automatic Control, IEEE Transactions on
