Title :
An Optimal Global Nearest Neighbor Metric
Author :
Fukunaga, Keinosuke ; Flick, Thomas E.
Author_Institution :
School of Electrical Engineering, Purdue University, West Lafayette, IN 47907.
fDate :
5/1/1984 12:00:00 AM
Abstract :
A quadratic metric dAO (X, Y) =[(X - Y)T AO(X - Y)]¿ is proposed which minimizes the mean-squared error between the nearest neighbor asymptotic risk and the finite sample risk. Under linearity assumptions, a heuristic argument is given which indicates that this metric produces lower mean-squared error than the Euclidean metric. A nonparametric estimate of Ao is developed. If samples appear to come from a Gaussian mixture, an alternative, parametrically directed distance measure is suggested for nearness decisions within a limited region of space. Examples of some two-class Gaussian mixture distributions are included.
Keywords :
Euclidean distance; Extraterrestrial measurements; Laboratories; Linearity; Measurement standards; Nearest neighbor searches; Neural networks; Size measurement; Statistics; Time measurement; Asymptotic risk; Bayes risk; distance measure; finite sample size; nearest neighbor rule;
Journal_Title :
Pattern Analysis and Machine Intelligence, IEEE Transactions on
DOI :
10.1109/TPAMI.1984.4767523
