Nearest neighbor pattern classification

Author

Cover, T.M. ; Hart, P.E.

Volume

Issue

fYear

1967

fDate

1/1/1967 12:00:00 AM

Firstpage

Lastpage

Abstract

The nearest neighbor decision rule assigns to an unclassified sample point the classification of the nearest of a set of previously classified points. This rule is independent of the underlying joint distribution on the sample points and their classifications, and hence the probability of error $R$ of such a rule must be at least as great as the Bayes probability of error $R^{\\ast }$ --the minimum probability of error over all decision rules taking underlying probability structure into account. However, in a large sample analysis, we will show in the $M$ -category case that $R^{\\ast } \\leq R \\leq R^{\\ast }(2 --MR^{\\ast }/(M-1))$ , where these bounds are the tightest possible, for all suitably smooth underlying distributions. Thus for any number of categories, the probability of error of the nearest neighbor rule is bounded above by twice the Bayes probability of error. In this sense, it may be said that half the classification information in an infinite sample set is contained in the nearest neighbor.

Keywords

Pattern classification;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/TIT.1967.1053964

Filename

1053964

Link To Document

https://search.isc.ac/dl/search/defaultta.aspx?DTC=49&DC=908596