A theorem on invariance of estimability of linear parametric functions in linear models |
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Authors: | W Fraser B L Raktoe |
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Institution: | Department of Mathematics and Statistics , University of Guelph , Guelph, Ontario, Canada |
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Abstract: | Consider the general linear model Y = Xβ + ? , where E??'] = σ2I and rank of X is less than or equal to the number of columns of X. It is well known that the linear parametric function λ'β is estimable if and only if λ' is in the row space of X. This paper characterizes all orthogonal matrices P such that the row space of XP is equal to the row space of X, i.e. the estimability of λ'β is invariant under P. An additional property of these matrices is the invariance of the spectrum of the information matrix X'X. An application of the results is also given. |
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Keywords: | estimability linear models spectrum of the information matrix invariance |
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