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" The Coordinate-Free Approach to Gauss-Markov Estimation "
by Hilmar Drygas.
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BL
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745157
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b565106
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| Main Entry
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by Hilmar Drygas.
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The Coordinate-Free Approach to Gauss-Markov Estimation\ by Hilmar Drygas.
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| Publication Statement
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Berlin, Heidelberg : Springer Berlin Heidelberg, 1970
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| Series Statement
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Lecture Notes in Operations Research and Mathematical Systems, Economics, Computer Science, Information and Control, 40.
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| ISBN
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3540053263
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: 3642651488
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: 9783540053262
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: 9783642651489
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| Contents
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Content --; ʹ 1. Justification of the coordinate-free approach --; ʹ 2. Vector-spaces --; a) Definition of a vector-space --; b) Inner products and semi-inner products --; c) Bases of a vector-space, orthogonal complement --; d) Linear functions, linear mappings and adjoint mappings --; e) Definition of set-operations in vector-spaces --; f) The Farkas' theorem --; g) Projections, generalized inverses and pseudo-inverses --; ʹ 3. Linear statistical models --; a) Definition of linear statistical models --; b) Least squares-estimators and Gauss-Markov estimators --; c) Supplements to least squares and Gauss-Markov estimation --; d) Examples: --; e) The estimation of?2 --; f) Stepwise least squares and stepwise Gauss-Markov estimation.
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| Abstract
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These notes originate from a couple of lectures which were given in the Econometric Workshop of the Center for Operations Research and Econometrics (CORE) at the Catholic University of Louvain. The participants of the seminars were recommended to read the first four chapters of Seber's book [40], but the exposition of the material went beyond Seber's exposition, if it seemed necessary. Coordinate-free methods are not new in Gauss-Markov estimation, besides Seber the work of Kolmogorov [11], SCheffe [36], Kruskal [21], [22] and Malinvaud [25], [26] should be mentioned. Malinvaud's approach however is a little different from that of the other authors, because his optimality criterion is based on the ellipsoid of c- centration. This criterion is however equivalent to the usual c- cept of minimal covariance-matrix and therefore the result must be the same in both cases. While the usual theory gives no indication how small the covariance-matrix can be made before the optimal es timator is computed, Malinvaud can show how small the ellipsoid of concentration can be made: it is at most equal to the intersection of the ellipssoid of concentration of the observed random vector and the linear space in which the (unknown) expectation value of the observed random vector is lying. This exposition is based on the observation, that in regression ~nalysis and related fields two conclusions are or should preferably be applied repeatedly.
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Economics.
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| LC Classification
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QA276.8B945 1970
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Hilmar Drygas
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