On robust mahalanobis distance issued from minimum vector variance

Detecting outliers in high dimension datasets remains a challenging task.Under this circumstance, robust location and scale estimators are usually proposed in place of the classical estimators. Recently, a new robust estimator for multivariate data known as minimum variance vector (MVV) was introduc...

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書目詳細資料
Main Authors:	Ali, Hazlina, Syed Yahaya, Sharipah Soaad
格式:	Article
語言:	English
出版:	Pushpa Publishing House 2013
主題:	QA Mathematics
在線閱讀:	http://repo.uum.edu.my/21569/1/FJMS%2074%202%202013%20249%20268.pdf http://repo.uum.edu.my/21569/ http://www.pphmj.com/abstract/7503.htm
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機構:	Universiti Utara Malaysia
語言:	English

實物特徵
總結:	Detecting outliers in high dimension datasets remains a challenging task.Under this circumstance, robust location and scale estimators are usually proposed in place of the classical estimators. Recently, a new robust estimator for multivariate data known as minimum variance vector (MVV) was introduced. Besides inheriting the nice properties of the famous MCD estimator, MVV is computationally more efficient. This paper proposes MVV to detect outliers via Mahalanobis squared distance (MSD).The results revealed that MVV is more effective in detecting outliers and in controlling Type I error compared with MCD.

On robust mahalanobis distance issued from minimum vector variance

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