Kuran, ÖzgeYalaz, Seçil2024-04-242024-04-242023Kuran, Ö. ve Yalaz, S. (2023). Kernel mixed and Kernel stochastic restricted ridge predictions in the partially linear mixed measurement error models: an application to COVID-19. Journal of Applied Statistics, 1-25.0266-47631360-0532https://doi.org/10.1080/02664763.2023.2248418https://hdl.handle.net/11468/16755In this article, we define mixed predictor and stochastic restricted ridge predictor of partially linear mixed measurement error models by taking advantage of Kernel approximation. Under matrix mean square error criterion, we make the comparison of the superiorities the linear combinations of the new defined predictors. Then we investigate the asymptotic normality characteristics and the situation of the unknown covariance matrix of measurement errors. Finally, the study is ended with a Monte Carlo simulation study and COVID-19 data application.eninfo:eu-repo/semantics/closedAccessMulticollinearityKernel Mixed PredictorKernel Stochastic Restricted Ridge PredictorAsymptotic NormalityPartially Linear Mixed Measurement Error ModelsKernel mixed and Kernel stochastic restricted ridge predictions in the partially linear mixed measurement error models: an application to COVID-19Kernel mixed and Kernel stochastic restricted ridge predictions in the partially linear mixed measurement error models: an application to COVID-19ArticleWOS:0010502818000012-s2.0-8516826572510.1080/02664763.2023.2248418Q1N/A