https://orcid.org/0000-0001-5632-001X
References
- G.M. Bayhan and M. Bayhan, Forecasting using autocorrelated errors and multicollinear predictor variables, Comput. Ind. Eng. 34 (1998), pp. 413–421.
- BioWorld. Available at: https://www.bioworld.com/articles/501906-chinas-cnbgsinopharm-covid-19-vaccine-is-79-effective?v=preview, 2020.
- Centers for Disease Control and Prevention, Pfizer-BioNTech (COMIRNATY) COVID-19 Vaccine Questions. Available at: https://www.cdc.gov/vaccines/covid-19/info-by-product/pfizer/pfizer-bioNTech-faqs.html, 2021.
- Centers for Disease Control and Prevention, Moderna COVID-19 Vaccine Questions. Available at: https://www.cdc.gov/vaccines/covid-19/info-by-product/moderna/moderna-faqs.html#vaccine-safety-efficacy, 2021.
- Centers for Disease Control and Prevention, Janssen COVID-19 Vaccine (Johnson & Johnson). Available at: https://www.cdc.gov/vaccines/covid-19/info-by-product/janssen/index.html, 2021.
- C. Cheng and J.W. Van Ness, Statistical Regression with Measurement Error, Arnold, London, 1999.
- Clinical trials area. Available at: https://www.clinicaltrialsarena.com/news/russia-sputnik-v-efficacy-covid/, 2021.
- Comparing the COVID-19 Vaccines: How Are They Different? Available at: https://www.yalemedicine.org/news/covid-19-vaccine-comparison, 2021.
- P.J. Diggle, K.Y. Liang, and S.L. Zeger, Analysis of Longitudinal Data, Clarendon Press, Oxford, 1994.
- H. Emami, Ridge stochastic restricted estimators in semiparametric linear measurement error models, J. Iran. Stat. Soc. 17 (2018), pp. 181–203.
- European Centre for Disease Prevention and Control, COVID-19 Vaccine Tracker. Available at: https://vaccinetracker.ecdc.europa.eu/public/extensions/COVID-19/vaccine-tracker.html, 2021.
- European Centre for Disease Prevention and Control. Download COVID-19 Datasets. Available at: https://www.ecdc.europa.eu/en/covid-19/data, 2021.
- R.W. Farebrother, Further results on the mean square error of ridge regression, J. R. Stat. Soc. B 38 (1976), pp. 248–250.
- W.A. Fuller, Measurement Error Models, John Wiley and Sons Inc, Hoboken (NJ), 1987.
- A.R. Gilmour, R. Thompson, and B.R. Cullis, Average information REML: an efficient algorithm for variance parameter estimation in linear mixed models, Biometrics 51 (1995), pp. 1440–1450.
- F. Ghapani and B. Babadi, A new ridge estimator in linear measurement error model with stochastic linear restrictions, J. Iran. Stat. Soc. 15 (2016), pp. 87–103.
- F. Ghapani and B. Babadi, Two parameter weighted mixed estimator in linear measurement error models, Commun. Stat. Simul. Comput. 51 (2022), pp. 6936–6946.
- F. Ghapani, A.R. Rasekh, and B. Babadi, The weighted ridge estimator in stochastic restricted linear measurement error models, Stat. Pap. 59 (2018), pp. 709–723.
- C.R. Henderson, Estimation of genetic parameters (abstract), Ann. Math. Stat. 21 (1950), pp. 309–310.
- C.R. Henderson, O. Kempthorne, S.R. Searle, and C.N. Von Krosig, Estimation of environmental and genetic trends from records subject to culling, Biometrics 15 (1959), pp. 192–218.
- Ö. Kuran and M.R. Özkale, Gilmour's approach to mixed and stochastic restricted ridge predictions in linear mixed models, Linear Algebra Appl. 508 (2016), pp. 22–47.
- H. Liang, W. Hardle, and R.J. Carroll, Large sample theory in a semiparametric partially linear errors-in-variables models, SFB 373 Discussion Paper (1997). http://hdl.handle.net/10419/66252
- Z. Li and S. Ding, Small sample properties about estimates in linear mixed models under linear restrictions, Chin. J. Appl. Probab. Statist. 27 (2011), pp. 323–330.
- Z. Li, Estimation in linear mixed models for longitudinal data under linear restricted conditions, J. Statist. Plan. Inference 141 (2011), pp. 869–876.
- X. Lin and R.J. Carroll, Semiparametric regression for clustered data using generalized estimating equations, J. Amer. Stat. Assoc. 96 (2001), pp. 1045–1056.
- M.C. McDonald and D.I. Galarneau, A Monte Carlo evaluation of some ridge-type estimators, J. Am. Stat. Assoc. 70 (1975), pp. 407–416.
- D.C. Montgomery, E.A. Peck, and G.G. Vining, Introduction to Linear Regression Analysis, John Wiley and Sons Inc, Hoboken, 2012.
- J.P. Newhouse and S.D. Oman, An evaluation of ridge estimators, Rand. Corporation R-716-PR (1971), pp. 1–28.
- M.R. Özkale and F. Can, An evaluation of ridge estimator in linear mixed models: an example from kidney failure data, J. Appl. Stat. 44 (2017), pp. 2251–2269.
- M.R. Özkale, A stochastic restricted ridge regression estimator, J. Multivariate Anal. 100 (2009), pp. 1706–1716.
- L.N. Pereira and P.S. Coelho, A small area predictor under area-level linear mixed models with restrictions, Commun. Stat. Theor. Meth. 41 (2012), pp. 2524–2544.
- C.R. Rao and H. Toutenburg, Linear Models-Least Squares and Alternatives, Springer-Verlag, New York, 1995.
- G.K. Robinson, That BLUP is a good thing: the estimation of random effects (with discussion), Stat. Sci. 6 (1991), pp. 15–32.
- S.R. Searle, Matrix Algebra Useful for Statistics, JohnWiley and Sons, New York, 1982.
- R. Shiller, A distributed lag estimator derived from smoothness priors, Econometrica 41 (1973), pp. 775–778.
- F. Štulajter, Predictions in nonlinear regression models, Acta Math. Univ. Comenianae LXVI (1997), pp. 71–81.
- H. Theil and A.S. Goldberger, On pure and mixed statistical estimation in economics, Int. Econ. Rev. 2 (1961), pp. 65–78.
- C.M. Theobald, Generalizations of mean square error applied to ridge regression, J. R. Stat. Soc. Ser. B 36 (1974), pp. 103–106.
- J. Wu and Y. Asar, A weighted stochastic restricted ridge estimator in partially linear model, Commun. Stat. Theor. Meth. 46 (2017), pp. 9274–9283.
- S. Yalaz and Ö. Kuran, Kernel estimator and predictor of partially linear mixed-effect errors-in-variables model, J. Stat. Comput. Simul. 91 (2021), pp. 934–951.
- H. Yang, H. Ye, and K. Xue, A further study of predictions in linear mixed models, Commun. Stat. Theor. Meth. 43 (2014), pp. 4241–4252.