Authors: Chao Yuan, Bao Guang Tian

Abstract:

A relative efficiency is defined as Ridge Estimate in the general linear model. The relative efficiency is based on the Mean square error. In this paper, we put forward a parameter of Ridge Estimate and discussions are made on the relative efficiency between the ridge estimation and the General Ridge Estimate. Eventually, this paper proves that the estimation is better than the general ridge estimate, which is based on the MSE.

Keywords: Ridge estimate, generalized ridge estimate, MSE, relative efficiency.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1339546

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References:

[1] A.Y. Liu, S.G. Wang. A new relative efficiency of least square estimation in linear model. Applied probability and statistics, 1989, 15(2), pp.97-104.
[2] Hoerl, A.E., Kennard, R.W. Ridge regression: Biased estimation for non-orthogonal problems (J). Technometrics, 1970, 12:55-88.
[3] Hoerl, A.E., Kennard, R.W. Ridge regression: Application for non-orthogonal problems (J). Technometrics, 1970, 12:69-72.
[4] Q. Tang. The Relative Efficiency of General Ridge Estimate (J). Journal of Chengdu University (Natural science), 1991, 10 (2): 42-451
[5] Trenkler, G. On the performance of biased estimators in the linear regression model with correlated or heteroscedastic errors (J). Journal of Econometrics 1984, 25:179-190.
[6] P.H. Wang. The Relative Efficiency of Generalized Ridge Estimate (J), Journal of Chengdu University (Natural science), 2001, 20 (2).
[7] P.H. Wang. The Efficiency of Generalized Ridge Estimate (J). Journal of Quan Zhou University (Natural science) 1998, 16 (2): 13-151.
[8] A.Y.L. Huang, G.J. Chen. The relative efficiency of parameter estimation in linear model (J). Applied probability and statistics, 1998, 14 (2): 159-1641.
[9] C. Yuan, B.G. Tian, A new relative efficiency based on the least eigenvalue in generalized linear model (J). International science index, 2016, 9 (10).