Asymptotic efficiency of classifying procedures using the Hermite series estimate of multivariate probability densities (Corresp.)

Author

Greblicki, Wlodzimierz

Volume

Issue

fYear

1981

fDate

5/1/1981 12:00:00 AM

Firstpage

364

Lastpage

366

Abstract

Pattern recognition procedures derived from a nonparametric estimate of multivariate probability density functions using the orthogonal Hermite system are examined. For sufficiently regular densities, the convergence rate of the mean integrated square error (MISE) is $O(n^{-l+\\epsilon})$ , $\\epsilon > 0$ , where $n$ is the number of observations and is independent of the dimension. As a consequence, the rate at which the probability of misclassification converges to the Bayes probability of error as the length $n$ of the learning sequence tends to infinity is also independent of the dimension of the class densities and equals $O(n^{-1/2+ \\delta }), \\delta > O$ .

Keywords

Nonparametric estimation; Pattern classification; Convergence; Estimation theory; H infinity control; Information theory; Nearest neighbor searches; Neural networks; Pattern recognition; Probability density function; Random variables; Surface-mount technology;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/TIT.1981.1056345

Filename

1056345

Link To Document

https://search.isc.ac/dl/search/defaultta.aspx?DTC=49&DC=933174