Testing the Significance of Regression Coefficients in Liu Type Estimators
Year 2024,
Volume: 37 Issue: 4, 2062 - 2083, 01.12.2024
Hilal Kaplan Tabak
,
Meral Ebegil
,
Esra Gökpınar
Abstract
In the linear regression model, the multicollinearity problem arises when there is a linear relationship between independent variables. This situation causes the variance of the estimations of the model parameters obtained by the Least Squares Estimator method to increase and move away from the true value, resulting in unstable and incorrect results. Biased Estimator methods are developed to eliminate the adverse effects caused by multicollinearity. In this study, a test statistic is obtained to test the significance of the model coefficients for the Liu-Type Estimator using the test statistic method suggested in the study of Halawa and El-Bassiouni (2000). With a simulation study, the significance of the model coefficients of the Ridge, Liu, and Liu type biased estimators in different situations is tested; the type I errors and power values of the estimators are calculated; the results are compared. In addition, a real data application is performed to better understand the test procedure.
References
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- [2] Liski, E.P., “A test of the mean square error criterion for shrinkage estimators”, Communications in Statistics, 11(5): 543-562, (1982).
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- [10] Özkale, M.R., Kaçıranlar, S., “Superiority of the r-d class estimator over some estimators by the mean square error matrix criterion”, Stattistics and Probability Letters, 77: 438–446, (2007).
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- [12] Ebegil, M., Gökpınar, F., “A test statistic to choose between liu-type and least squares estimator based on mean square error criteria”, Journal of Applied Statistics, 39(10): 2081-2096, (2012).
- [13] Gökpınar, E., Ebegil, M., “A study on tests of hypothesis based on ridge estimator”, Gazi University Journal of Science, 29(4): 769-781, (2016).
- [14] Wilcox, R.R., “Multicolinearity and ridge regression: results on type I errors, power and heteroscedasticity”, Journal of Applied Statistics, 46(5): 946-957, (2019).
- [15] Melo, S.P., Kibria, B.M.G., “Testing the regression coefficients in the liu linear regression model: simulation and application”, International Journal of Statistical Analysis, 2(1): 55-68, (2021).
- [16] Hald, A., “Statistical Theory with Engineering Applications”, New York: Wiley, (1952).
- [17] Hoerl, A.E., Kennard, R.W., Baldwin, K.F., “Ridge regression. Some simulation”, Communications in Statistics, 5: 105–123, (1975).
- [18] McDonald, G., Galarneau, D., “A monte carlo evaluation of some ridge-type estimators”, Journal of the American Statistical Association, 70 (350): 407-416, (1975).
- [19] Bradley, J.V., “Robustness?”, British Journal of Mathematical and Statistical Psychology, 31:144-152, (1978).
Year 2024,
Volume: 37 Issue: 4, 2062 - 2083, 01.12.2024
Hilal Kaplan Tabak
,
Meral Ebegil
,
Esra Gökpınar
References
- [1] Hoerl, A.E., Kennard, R.W., “Ridge regression. Biased estimation for nonorthogonal problems”, Technometrics, 12: 55–67, (1970).
- [2] Liski, E.P., “A test of the mean square error criterion for shrinkage estimators”, Communications in Statistics, 11(5): 543-562, (1982).
- [3] Liu, K., “A new class of biased estimate in linear regression”, Communications in Statistics. Theory and Methods, 22(2): 393-402, (1993).
- [4] Akdeniz, F., Kaçıranlar, S., “On the almost unbiased generalized liu estimator and unbiased estimation of the bias and MSE”, Communications in Statistics-Theory and Methods, 24(7): 1789-179, (1995).
- [5] Halawa, A.M., Bassiouni, M.Y., “Tests of regression coefficients under ridge regression models”, Journal of Statistical Simulation and Computation, 65: 341-56, (2000).
- [6] Kibria, B.M.G., “Performance of some new ridge regression estimators”, Simulation and Computation, 32(2): 419-435, (2003).
- [7] Liu, K., “Using liu-type estimator to combat collinearity”, Communications in Statistics, 32(5): 1009-1020, (2003).
- [8] Ebegil, M., Gökpınar, F., Ekni, M., “A simulation study on some shrinkage estimators”, Hacettepe Journal of Mathematics and Statistics, 35: 213–226, (2006).
- [9] Liski, E.P., “ Choosing a shrinkage estimator a test of the mean square error criterion”, Proc. First Tampere Sem. Linear Models, 245-262, (1983).
- [10] Özkale, M.R., Kaçıranlar, S., “Superiority of the r-d class estimator over some estimators by the mean square error matrix criterion”, Stattistics and Probability Letters, 77: 438–446, (2007).
- [11] Sakallıoğlu, S., Kaçıranlar, S., “A new biased estimator based on ridge estimation”, Statistical Papers, 49: 669-689, (2008).
- [12] Ebegil, M., Gökpınar, F., “A test statistic to choose between liu-type and least squares estimator based on mean square error criteria”, Journal of Applied Statistics, 39(10): 2081-2096, (2012).
- [13] Gökpınar, E., Ebegil, M., “A study on tests of hypothesis based on ridge estimator”, Gazi University Journal of Science, 29(4): 769-781, (2016).
- [14] Wilcox, R.R., “Multicolinearity and ridge regression: results on type I errors, power and heteroscedasticity”, Journal of Applied Statistics, 46(5): 946-957, (2019).
- [15] Melo, S.P., Kibria, B.M.G., “Testing the regression coefficients in the liu linear regression model: simulation and application”, International Journal of Statistical Analysis, 2(1): 55-68, (2021).
- [16] Hald, A., “Statistical Theory with Engineering Applications”, New York: Wiley, (1952).
- [17] Hoerl, A.E., Kennard, R.W., Baldwin, K.F., “Ridge regression. Some simulation”, Communications in Statistics, 5: 105–123, (1975).
- [18] McDonald, G., Galarneau, D., “A monte carlo evaluation of some ridge-type estimators”, Journal of the American Statistical Association, 70 (350): 407-416, (1975).
- [19] Bradley, J.V., “Robustness?”, British Journal of Mathematical and Statistical Psychology, 31:144-152, (1978).