The Study of Relative Efficiency in Growth Curve Model
In this paper, some relative efficiency have been
discussed, including the LSE estimate with respect to BLUE in curve
model. Four new kinds of relative efficiency have defined, and their
upper bounds have been discussed.
[1] S.G. Wang, M.X. Wu, and Z.Z. Jia, Matrix Inequality, Beijing: Science
Press. 2006.
[2] Y.L. Huang, G.J. Chen, “Parameters estimation of relative Efficiency in
the linear model,” Application of probability and statistics. 1988, 14, pp.
159-164.
[3] A.P. Verbyla, W.N. Vernables, “An extension of the growth model,”
Biometrika.1988, 75, pp. 129-138.
[4] A.Y. Liu, S.G. Wang, “A new relative efficiency of least-square
estimation in Linear model,” Applied Probability and Statistics. 1989, 15,
pp. 97-104.
[5] J.L. Wang, D.D. Gao, “Efficiency of generalized least squares estimate
under the meaning of Euclidean model,” Applied Probability and
Statistics. 1991, 7, pp. 361-365. [6] D.D. Gao, J.L. Wang, “Probability of the Generalized least squares
estimation,” Systems and Science. 1990, 10, pp. 125-130.
[7] P.R. Ding, “Several new relative efficiency in Growth curve model,”
Kashgar Teachers College Jourals.1999, 19, pp.23-26.
[8] P. Bloomfield, G.S. Watson, “The Efficiency of Least Squares,”
Biometrika, 1975, 62, pp. 121-128.
[9] J. Li, L. Xia, N.N. Wang, “A new relative efficiency in generalized linear
mode,” Proceedings of the Eighth International Conference on Matrix
Theory and its Applications.2009, 84-86.
[10] J.X. Pan, “Regression parameters in growth curve model of least squares
estimate and Gauss-Markov theorem,” Mathematical statistics and
applied probability. 1988, 3, pp. 169-185.
[11] Q.R. Deng, J.B. Chen, “Some Relative Efficiencies of LSE in Growth
Curve Model,” Mathematical Applicant. 1997, 10, pp. 60-65.
[12] G.K. Hu, P. Peng, “A new relative efficiency in growth curve model of
mean value matrix,” Journal of Dong Hua institute of technology. 2006,
29, pp. 394-396.
[13] H. Hotelling, “The Relationship Between The Two Sets of Variables,”
Biometrika, 1936, 36, pp. 321-377.
[14] X.G. Ni, Commonly used matrix theory and method, Shanghai: Shanghai
Scientific and Technical Press. 1985.
[15] C.G. Khatri, C.R. Rao, “Some generalization of Kantorovich inequality,”
Sankhya, 1982, 44, pp. 91-102.
[1] S.G. Wang, M.X. Wu, and Z.Z. Jia, Matrix Inequality, Beijing: Science
Press. 2006.
[2] Y.L. Huang, G.J. Chen, “Parameters estimation of relative Efficiency in
the linear model,” Application of probability and statistics. 1988, 14, pp.
159-164.
[3] A.P. Verbyla, W.N. Vernables, “An extension of the growth model,”
Biometrika.1988, 75, pp. 129-138.
[4] A.Y. Liu, S.G. Wang, “A new relative efficiency of least-square
estimation in Linear model,” Applied Probability and Statistics. 1989, 15,
pp. 97-104.
[5] J.L. Wang, D.D. Gao, “Efficiency of generalized least squares estimate
under the meaning of Euclidean model,” Applied Probability and
Statistics. 1991, 7, pp. 361-365. [6] D.D. Gao, J.L. Wang, “Probability of the Generalized least squares
estimation,” Systems and Science. 1990, 10, pp. 125-130.
[7] P.R. Ding, “Several new relative efficiency in Growth curve model,”
Kashgar Teachers College Jourals.1999, 19, pp.23-26.
[8] P. Bloomfield, G.S. Watson, “The Efficiency of Least Squares,”
Biometrika, 1975, 62, pp. 121-128.
[9] J. Li, L. Xia, N.N. Wang, “A new relative efficiency in generalized linear
mode,” Proceedings of the Eighth International Conference on Matrix
Theory and its Applications.2009, 84-86.
[10] J.X. Pan, “Regression parameters in growth curve model of least squares
estimate and Gauss-Markov theorem,” Mathematical statistics and
applied probability. 1988, 3, pp. 169-185.
[11] Q.R. Deng, J.B. Chen, “Some Relative Efficiencies of LSE in Growth
Curve Model,” Mathematical Applicant. 1997, 10, pp. 60-65.
[12] G.K. Hu, P. Peng, “A new relative efficiency in growth curve model of
mean value matrix,” Journal of Dong Hua institute of technology. 2006,
29, pp. 394-396.
[13] H. Hotelling, “The Relationship Between The Two Sets of Variables,”
Biometrika, 1936, 36, pp. 321-377.
[14] X.G. Ni, Commonly used matrix theory and method, Shanghai: Shanghai
Scientific and Technical Press. 1985.
[15] C.G. Khatri, C.R. Rao, “Some generalization of Kantorovich inequality,”
Sankhya, 1982, 44, pp. 91-102.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:69205", author = "Nan Chen and Baoguang Tian", title = "The Study of Relative Efficiency in Growth Curve Model", abstract = "In this paper, some relative efficiency have been
discussed, including the LSE estimate with respect to BLUE in curve
model. Four new kinds of relative efficiency have defined, and their
upper bounds have been discussed.
", keywords = "Relative efficiency, LSE estimate, BLUE estimate,
Upper bound, Curve model.", volume = "8", number = "10", pages = "1381-4", }
