http://orcid.org/0000-0002-0229-7958
References
- Algamal, Z. Y. 2018. Shrinkage estimators for gamma regression model. Electronic Journal of Applied Statistical Analysis 11 (1):253–68. doi:10.1285/i20705948v11n1p253.
- Algamal, Z. Y., and M. H. Lee. 2017. A novel molecular descriptor selection method in QSAR classification model based on weighted penalized logistic regression. Journal of Chemometrics 31 (10):e2915. doi:10.1002/cem.2915.
- Algamal, Z. Y., M. H. Lee, A. M. Al-Fakih, and M. Aziz. 2015. High-dimensional QSAR prediction of anticancer potency of imidazo[4,5-b]pyridine derivatives using adjusted adaptive LASSO. Journal of Chemometrics 29 (10):547–56. doi:10.1002/cem.2741.
- Asar, Y., and A. Genç. 2016. New shrinkage parameters for the Liu-type logistic estimators. Communications in Statistics—Simulation and Computation 45 (3):1094–1103. doi:10.1080/03610918.2014.995815.
- Asar, Y., A. Karaibrahimoğlu, and A. Genç. 2014. Ridge regression parameters: A comparative Monte Carlo study. Hacettepe Journal of Mathematics and Statistics 43 (5):827–41. Modified
- Babu, G. J., and Y. P. Chaubey. 1996. Asymptotics and bootstrap for inverse Gaussian regression. Annals of the Institute of Statistical Mathematics 48 (1):75–88. doi:10.1007/bf00049290.
- Bhat, S. S. 2016. A comparative study on the performance of new ridge estimators. Pakistan Journal of Statistics and Operation Research 12 (2):317–25.
- Bhattacharyya, G. K., and A. Fries. 1982. Inverse Gaussian regression and accelerated life tests. Lecture Notes-Monograph Series 2:101–17.
- Chaubey, Y. P. 2002. Estimation in inverse Gaussian regression: comparison of asymptotic and bootstrap distributions. Journal of Statistical Planning and Inference 100 (2):135–43. doi:10.1016/S0378-3758(01)00128-8
- De Jong, P., and G. Z. Heller. 2008. Generalized linear models for insurance data. Vol. 10. Cambridge: Cambridge University Press.
- Dorugade, A., and D. Kashid. 2010. Alternative method for choosing ridge parameter for regression. Applied Mathematical Sciences 4 (9):447–56.
- Ducharme, G. R. 2001. Goodness-of-fit tests for the inverse Gaussian and related distributions. Test 10 (2):271–90. doi:10.1007/bf02595697.
- Folks, J. L., and A. S. Davis. 1981. Regression models for the inverse Gaussian distribution. Statistical Distributions in Scientific Work 4 (1):91–97.
- Fries, A., and G. K. Bhattacharyya. 1986. Optimal design for an inverse Gaussian regression model. Statistics & Probability Letters 4 (6):291–94.
- Hefnawy, A. E., and A. Farag. 2014. A combined nonlinear programming model and Kibria method for choosing ridge parameter regression. Communications in Statistics—Simulation and Computation 43 (6):1442–70. doi:10.1080/03610918.2012.735317.
- Heinzl, H., and M. Mittlböck. 2002. Adjusted R2 measures for the inverse Gaussian regression model. Computational Statistics 17 (4):525–44. doi:10.1007/s001800200125.
- Hoerl, A. E., and R. W. Kennard. 1970. Ridge regression: Biased estimation for nonorthogonal problems. Technometrics 12 (1):55–67.
- Kibria, B. M. G. 2003. Performance of some new ridge regression estimators. Communications in Statistics—Simulation and Computation 32 (2):419–35. doi:10.1081/SAC-120017499.
- Kibria, B. M. G., K. Månsson, and G. Shukur. 2012. Performance of some logistic ridge regression estimators. Computational Economics 40 (4):401–14.
- Kibria, B. M. G., K. Månsson, and G. Shukur. 2015. A simulation study of some biasing parameters for the ridge type estimation of Poisson regression. Communications in Statistics—Simulation and Computation 44 (4):943–57. doi:10.1080/03610918.2013.796981.
- Lemeshko, B. Y., S. B. Lemeshko, K. A. Akushkina, M. S. Nikulin, and N. Saaidia. 2010. Inverse Gaussian model and its applications in reliability and survival analysis. In Mathematical and statistical models and methods in reliability, eds. V. V. Rykov, N. Balakrishnan, and M. S. Nikulin, vol. 26, 433–453. New York: Springer.
- Liu, G., and S. Piantadosi. 2017. Ridge estimation in generalized linear models and proportional hazards regressions. Communications in Statistics—Theory and Methods 46 (23):11466–79. doi:10.1080/03610926.2016.1267767.
- Mackinnon, M. J., and M. L. Puterman. 1989. Collinearity in generalized linear models. Communications in Statistics—Theory and Methods 18 (9):3463–72.
- Malehi, A. S., F. Pourmotahari, and K. A. Angali. 2015. Statistical models for the analysis of skewed healthcare cost data: A simulation study. Health Economics Review 5 (1):11. doi:10.1186/s13561-015-0045-7.
- Månsson, K., and G. Shukur. 2011. A Poisson ridge regression estimator. Economic Modelling 28 (4):1475–81. doi:10.1016/j.econmod.2011.02.030.
- Muniz, G., and B. G. Kibria. 2009. On some ridge regression estimators: An empirical comparisons. Communications in Statistics—Simulation and Computation 38 (3):621–30.
- Segerstedt, B. 1992. On ordinary ridge regression in generalized linear models. Communications in Statistics—Theory and Methods 21 (8):2227–46. doi:10.1080/03610929208830909.
- Uusipaikka, E. 2009. Confidence intervals in generalized regression models. Boca Raton, FL: Chapman & Hall/CRC Press.
- Wu, L., and H. Li. 2012. Variable selection for joint mean and dispersion models of the inverse gaussian distribution. Metrika 75 (6):795–808. doi:10.1007/s00184-011-0352-x.