References
- Alaouf, I.S., Styan, G.P.H. (1979). Characterizations of estimability in the general linear model. Ann. Stat. 7:194–200.
- Baksalary, J.K. (1984). Comparing stochastically restricted estimators in a linear regression model. Biom. J. 26:555–557.
- Chu, K.L., Isotalo, J., Puntanen, S., Styan, G.P.H. (2004). On decomposing the Watson efficiency of ordinary least squares in a partitioned weakly singular linear model. Sankhy
Ser. A 66:634–651.
- Groß, J., Puntanen, S. (2000). Estimation under a general partitioned linear model. Lin. Algebra Appl. 321:131–144.
- Groß, J., Trenkler, G. (1998). On the equality of linear statistics in general Gauss-Markov model. In: Mukherjee, S.P., Basu, S.K., Sinha, B.K., eds. Frontiers in Statistics and Probability. (pp. 189–194). New Delhi: Narosa Publishing.
- Groß, J., Trenkler, G., Werner, H.J. (2001). The equality of linear transformations of the ordinary least squares estimator and the best linear unbiased estimator. Sankhy
- Haslett, S., Puntanen, S. (2010). Equality of BLUEs or BLUPs under two linear models using stochastic restrictions. Stat. Pap. 51:465–475.
- Isotalo, J., Puntanen, S. (2009). A note on the equality of the OLSE and the BLUE of the parametric functions in the general Gauss-Markov model. Stat. Pap. 50:185–193.
- Liski, E.P. (1989). Comparing stochastically restricted linear estimators in a regression model. Biom. J. 31:313–316.
- Marsaglia, G., Styan, G.P.H. (1974). Equalities and inequalities for ranks of matrices. Lin. Multilin. Algeb. 2:269–292.
- Puntanen, S., Styan, G.P.H. (1989). The equality of the ordinary least squares estimator and the best linear unbiased estimator (with discussion). Am. Stat. 43:153–164.
- Puntanen, S., Styan, G.P.H., Werner, H.J. (2000). Two matrix-based proofs that the linear estimator Gy is the best linear unbiased estimator. J. Stat. Plann. Infer. 88:173–179.
- Qian, H., Schmidt, P. (2003). Partial GLS regression. Econnomet. Lett. 79:385–392.
- Rao, C.R. (1971). Unified theory of linear estimation. Sankhy
- Rao, C.R. (1973). Representations of best linear unbiased estimators in the Gauss-Markoff model with a singular dispersion matrix. J. Multivariate Anal. 3:276–292.
- Rao, C.R., Toutenburg, H., Shalabh, Heumann, C., (2008). Linear Models and Generalizations: Least Squares and Alternatives, 3rd ed. Berlin, Heidelberg, New York: Springer.
- Sengupta, D., Jammalamadaka, S.R. (2003). Linear Models: An Integrated Approach. Singapore: World Scientific Publishing Company.
- Shalabh, Toutenburg, H., (2005). Estimation of linear regression models with missing data: the role of stochastic linear constraints. Commun. Stat. Theor. Meth. 34:375–378.
- Tian, Y. (2007). Some decompositions of OLSEs and BLUEs under a partitioned linear model. Inter. Stat. Rev. 75:224–248.
- Tian, Y. (2010). On equalities of estimations of parametric functions under a general linear model and its restricted models. Metrika 72:313–330.
- Tian, Y., Beisiegel, M., Dagenais, E., Haines, C. (2008). On the natural restrictions in the singular Gauss-Markov model. Stat. Pap. 49:553–564.
- Tian, Y., Zhang, J.P. (2011). Some equalities for estimations of partial coefficients under a general linear regression model. Stat. Pap. 52:911–920.
- Trenkler, G. (1993). A note on comparing stochastically restricted linear estimators in a regression model. Biom. J. 35:125–128.
- Xu, J., Yang, H. (2007). Estimation in singular linear models with stochastic linear restrictions. Commun. Stat. Theor. Meth. 36:1945–1951.
- Zyskind, G. (1967). On canonical forms, non-negative covariance matrices and best and simple least squares linear estimators in linear models. Ann. Math. Stat. 38:1092–1109.