AbstractIn the general Gauss-Markoff model (Y, Xβ, σ2V), when V is singular, there exist linear functions of Y which vanish with probability 1 imposing some restrictions on Y as well as on the unknown β. In all earlier work on linear estimation, representations of best-linear unbiased estimators (BLUE's) are obtained under the assumption: “L′Y is unbiased for Xβ ⇒ L′X = X.” Such a condition is not, however, necessary. The present paper provides all possible representations of the BLUE's some of which violate the condition L′X = X. Representations of X for given classes of BLUE's are also obtained
Some recent work of the author on 'Unified Theory of Linear Estimation' is described. The general Ga...
New results in matrix algebra applied to the fundamental bordered matrix of linear estimation theory...
AbstractNew results in matrix algebra applied to the fundamental bordered matrix of linear estimatio...
AbstractIn the general Gauss-Markoff model (Y, Xβ, σ2V), when V is singular, there exist linear func...
In this paper we obtain the complete class of representations and useful subclasses of MV-UB-LE and ...
This article completes and simplifies earlier results on the derivation of best linear, or affine, u...
This article completes and simplifies earlier results on the derivation of best linear, or affine, u...
AbstractThis article completes and simplifies earlier results on the derivation of best linear, or a...
We consider a general Gauss-Markoff model (Y, Xβ, σ2V), where E(Y)=Xβ, D(Y)=σ2V. There may be defici...
Consider the Gauss-Markoff model (Y, Xβ, σ<SUP>2</SUP>V) in the usual notation (Rao, 1973a, p. 294)....
It is known that if the Gauss-Markov model M = {Y,Xβ, σ<SUP>2</SUP>V} has the column space of the mo...
The admissibility results of Rao (1976), proved in the context of a nonsingular covariance matrix, a...
AbstractNecessary and sufficient conditions are established for the set of all admissible linear est...
We consider the general Gauss-Markov model $( Y, X\boldsymbol\beta, V)$, where $E(Y)= X\boldsymbol\b...
The first lecture in this series is devoted to a survey of contributions during the last five years ...
Some recent work of the author on 'Unified Theory of Linear Estimation' is described. The general Ga...
New results in matrix algebra applied to the fundamental bordered matrix of linear estimation theory...
AbstractNew results in matrix algebra applied to the fundamental bordered matrix of linear estimatio...
AbstractIn the general Gauss-Markoff model (Y, Xβ, σ2V), when V is singular, there exist linear func...
In this paper we obtain the complete class of representations and useful subclasses of MV-UB-LE and ...
This article completes and simplifies earlier results on the derivation of best linear, or affine, u...
This article completes and simplifies earlier results on the derivation of best linear, or affine, u...
AbstractThis article completes and simplifies earlier results on the derivation of best linear, or a...
We consider a general Gauss-Markoff model (Y, Xβ, σ2V), where E(Y)=Xβ, D(Y)=σ2V. There may be defici...
Consider the Gauss-Markoff model (Y, Xβ, σ<SUP>2</SUP>V) in the usual notation (Rao, 1973a, p. 294)....
It is known that if the Gauss-Markov model M = {Y,Xβ, σ<SUP>2</SUP>V} has the column space of the mo...
The admissibility results of Rao (1976), proved in the context of a nonsingular covariance matrix, a...
AbstractNecessary and sufficient conditions are established for the set of all admissible linear est...
We consider the general Gauss-Markov model $( Y, X\boldsymbol\beta, V)$, where $E(Y)= X\boldsymbol\b...
The first lecture in this series is devoted to a survey of contributions during the last five years ...
Some recent work of the author on 'Unified Theory of Linear Estimation' is described. The general Ga...
New results in matrix algebra applied to the fundamental bordered matrix of linear estimation theory...
AbstractNew results in matrix algebra applied to the fundamental bordered matrix of linear estimatio...