The Distribution of Robust Distances

The Distribution of Robust Distances

Mahalanobis-type distances in which the shape matrix is derived from a consistent, high-breakdown robust multivariate location and scale estimator have an asymptotic chi-squared distribution as is the case with those derived from the ordinary covariance matrix. For example, Rousseeuw's minimum...

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Veröffentlicht in:Journal of computational and graphical statistics 2005-12, Vol.14 (4), p.928-946
Hauptverfasser: Hardin, Johanna, Rocke, David M
Format: Artikel
Sprache:eng
Schlagworte:
Approximation
Asymptotic value
Covariance
Covariance matrices
Degrees of freedom
Estimators
Graph algorithms
Mahalanobis squared distance
Minimum covariance determinant
Multivariate analysis
Outlier detection
Outliers
Perceptual localization
Robust estimation
Sampling distributions
Statistics
Variance analysis
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Zusammenfassung:Mahalanobis-type distances in which the shape matrix is derived from a consistent, high-breakdown robust multivariate location and scale estimator have an asymptotic chi-squared distribution as is the case with those derived from the ordinary covariance matrix. For example, Rousseeuw's minimum covariance determinant (MCD) is a robust estimator with a high breakdown. However, even in quite large samples, the chi-squared approximation to the distances of the sample data from the MCD center with respect to the MCD shape is poor. We provide an improved F approximation that gives accurate outlier rejection points for various sample sizes.
ISSN:1061-8600
1537-2715
DOI:10.1198/106186005X77685