Title :
Ultimate performance of QEM classifiers
Author :
Comon, Pierre ; Bienvenu, Georges
Author_Institution :
Thomson Sintra, Sophia-Antipolis, France
fDate :
11/1/1996 12:00:00 AM
Abstract :
Supervised learning of classifiers often resorts to the minimization of a quadratic error, even if this criterion is more especially matched to nonlinear regression problems. It is shown that the mapping built by a quadratic error minimization (QEM) tends to output the Bayesian discriminating rules even with nonuniform losses, provided the desired responses are chosen accordingly. This property is for instance shared by the multilayer perceptron (MLP). It is shown that their ultimate performance can be assessed with finite learning sets by establishing links with kernel estimators of density
Keywords :
multilayer perceptrons; Bayesian discriminating rules; multilayer perceptron; pattern classification; probability; quadratic error; quadratic error minimization; supervised learning; ultimate performance; Bayesian methods; Databases; Encoding; Kernel; Multilayer perceptrons; Neural networks; Probability;
Journal_Title :
Neural Networks, IEEE Transactions on
