Concentration Ellipsoids, Their Planes of Support, and the Linear Regression Model

Concentration Ellipsoids, Their Planes of Support, and the Linear Regression Model

The relationship between the concentration ellipsoid of a random vector and its planes of support is exploited to provide a geometric derivation and interpretation of existing results for a general form of the linear regression model. In particular, the planes of support whose points of tangency to...

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Veröffentlicht in:Econometric reviews 2013-02, Vol.32 (2), p.220-243
1. Verfasser: Rogers, Alan J.
Format: Artikel
Sprache:eng
Schlagworte:
Bias
BLU estimators
Concentration ellipsoid
Derivation
Econometric models
Econometrics
Economic models
Ellipsoids
Estimators
Joints
Linear models
Linear regression
Mathematical analysis
Matrix
Planes
Planes of support
Random variables
Regression
Regression analysis
Studies
Variance analysis
Vectors (mathematics)
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Beschreibung
Zusammenfassung:The relationship between the concentration ellipsoid of a random vector and its planes of support is exploited to provide a geometric derivation and interpretation of existing results for a general form of the linear regression model. In particular, the planes of support whose points of tangency to the ellipsoid are contained in the range (or column space) of the design matrix are the source of all linear unbiased minimum variance estimators. The connection between this idea and estimators based on projections is explored, as is also its use in obtaining and interpreting some existing relative efficiency results.
ISSN:0747-4938
1532-4168
DOI:10.1080/07474938.2011.608055