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Detail of Publication

Text Language English
Authors Masakazu Iwamura, Shinichiro Omachi, and Hirotomo Aso
Title A Method to Estimate the True Mahalanobis Distance from Eigenvectors of Sample Covariance Matrix
Journal Lecture Notes in Computer Science (Joint IAPR International Workshops SSPR 2002 and SPR 2002)
Vol. 2396
Pages pp.498-507
Location Windsor, Ontario, Canada
Reviewed or not Reviewed
Month & Year August 2002
Abstract In statistical pattern recognition, the parameters of distributions are usually estimated from training sample vectors. However, estimated parameters contain estimation errors, and the errors cause bad influence on recognition performance when the sample size is not sufficient. Some methods can obtain better estimates of the eigenvalues of the true covariance matrix and can avoid bad influences caused by estimation errors of eigenvalues. However, estimation errors of eigenvectors of covariance matrix have not been considered enough. In this paper, we consider estimation errors of eigenvectors and show the errors can be regarded as estimation errors of eigenvalues. Then, we present a method to estimate the true Mahalanobis distance from eigenvectors of the sample covariance matrix. Recognition experiments show that by applying the proposed method, the true Mahalanobis distance can be estimated even if the sample size is small, and better recognition accuracy is achieved. The proposed method is useful for the practical applications of pattern recognition since the proposed method is effective without any hyper-parameters.
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