Advanced search
Publication Cover
Communications in Statistics - Simulation and Computation Volume 53, 2024 - Issue 4
Submit an article Journal homepage
217
Views
3
CrossRef citations to date
0
Altmetric
Article

A new improved Liu estimator for the QSAR model with inverse Gaussian response

Muhammad Nauman Akrama Department of Statistics, University of Sargodha, Sargodha, PakistanCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0001-6688-808X
ORCID Icon,
Muhammad Amina Department of Statistics, University of Sargodha, Sargodha, PakistanORCID Iconhttps://orcid.org/0000-0002-7431-5756
ORCID Icon,
B. M. Golam Kibriab Department of Mathematics and Statistics, Florida International University, Miami, Florida, USAORCID Iconhttps://orcid.org/0000-0002-6073-1978
ORCID Icon,
Mohammad Arashic Department of Statistics, Faculty of Mathematical Sciences, Ferdowsi University of Mashhad, IranORCID Iconhttps://orcid.org/0000-0002-5881-9241
ORCID Icon,
Adewale F. Lukmand Department of Physical Sciences, Landmark University, Omu-Aran, NigeriaORCID Iconhttps://orcid.org/0000-0003-2881-1297
ORCID Icon &
Nimra Afzale Department of Statistics, Bahauddin Zakariya University Multan, Pakistan
Pages 1873-1888 | Received 27 Jul 2021, Accepted 22 Mar 2022, Published online: 07 Apr 2022

References

  • Ahmad, S, and M. Aslam. 2020. Another proposal about the new two-parameter estimator for linear regression model with correlated regressors. Communications in Statistics - Simulation and Computation: 1–19. doi:10.1080/03610918.2019.1705975.
  • Akdeniz, F, and S. Kaçiranlar. 2001. More on the new biased estimator in linear regression. Sankhyā: The Indian Journal of Statistics, Series B 63:321–5.
  • Akram, M. N., M. Amin, and M. Qasim. 2020a. A new Liu-type estimator for the inverse Gaussian regression model. Journal of Statistical Computation and Simulation 90 (7):1153–72. doi:10.1080/00949655.2020.1718150.
  • Akram, M. N., M. Amin, and M. Amanullah. 2020b. Two-parameter estimator for the inverse Gaussian regression model. Communications in Statistics - Simulation and Computation: 1–19. doi:10.1080/03610918.2020.1797797.
  • Akram, M. N., M. Amin, and M. Qasim. 2020c. A new Liu-type estimator for the inverse Gaussian regression model. Journal of Statistical Computation and Simulation 90 (7):1153–72. doi:10.1080/00949655.2020.1718150.
  • Akram, M. N., M. Amin, M. A. Ullah, and S. Afzal. 2021. Modified ridge-type estimator for the inverse Gaussian regression model. Communications in Statistics-Theory and Methods: 1–19.
  • Akram, M. N., M. Amin, and M. A. Ullah. 2021. James Stein estimator for the inverse Gaussian regression model. Iranian Journal of Science and Technology, Transactions A: Science 45 (4):1389–403. doi:10.1007/s40995-021-01133-0.
  • Akram, M. N., M. Amin, A. F. Lukman, and S. Afzal. 2022. Principal component ridge type estimator for the inverse Gaussian regression model. Journal of Statistical Computation and Simulation :1–30. doi:10.1080/00949655.2021.2020274.
  • Akram, M. N., B. M. G. Kibria, M. R. Abonazel, and N. Afzal. 2022. On the performance of some biased estimators in the gamma regression model: Simulation and applications. Journal of Statistical Computation and Simulation :1–23. doi:10.1080/00949655.2022.2032059.
  • 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.
  • Algamal, Z. Y., M. K. Qasim, M. H. Lee, and T. H. M. Ali. 2020a. High-dimensional QSAR/QSPR classification modeling based on improving pigeon optimization algorithm. Chemometrics and Intelligent Laboratory Systems 206:104170–6. doi:10.1016/j.chemolab.2020.104170.
  • Algamal, Z. Y., M. K. Qasim, M. H. Lee, and T. H. M. Ali. 2020b. Improving grasshopper optimization algorithm for hyper-parameters estimation and feature selection in support vector regression. Chemometrics and Intelligent Laboratory Systems 1-22 208:104196. doi:10.1016/j.chemolab.2020.104196.
  • 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. 2018a. Developing a ridge estimator for the gamma regression model. Journal of Chemometrics 32 (10):e3054. doi:10.1002/cem.3054.
  • Algamal, Z. Y. 2018b. Shrinkage estimators for gamma regression model. Electronic Journal of Applied Statistical Analysis 11:253–68.
  • Algamal, Z. Y. 2019. Performance of ridge estimator in inverse Gaussian regression model. Communications in Statistics – Theory and Methods 48:3836–49.
  • Alheety, M. I, and B. M. G. Kibria. 2009. On the Liu and almost unbiased Liu estimators in the presence of multicollinearity with heteroscedastic or correlated errors. Surveys in Mathematics and Its Applications 4:155–67.
  • Amin, M., M. M. Amanullah, and M. Aslam. 2016. Empirical evaluation of the inverse Gaussian regression residuals for the assessment of influential points. Journal of Chemometrics 30 (7):394–404. doi:10.1002/cem.2805.
  • Amin, M., M. Qasim, S. Afzal, and K. Naveed. 2020. New ridge estimators in the inverse Gaussian regression: Monte Carlo simulation and application to chemical data. Communications in Statistics - Simulation and Computation: 1–18. doi:10.1080/03610918.2020.1797794.
  • Amin, M., M. N. Akram, and B. M. G. Kibria. 2021. A new adjusted Liu estimator for the Poisson regression model. Concurrency and Computation: Practice and Experience 33 (20):e6340. doi:10.1002/cpe.6340.
  • Bulut, Y. M, and M. Işilar. 2021. Two parameter Ridge estimator in the inverse Gaussian regression model. Hacettepe Journal of Mathematics and Statistics 50 (3):895–910.
  • Bulut, Y. M. 2021. Inverse Gaussian Liu-type estimator. Communications in Statistics - Simulation and Computation :1–16. doi:10.1080/03610918.2021.1971243.
  • Farebrother, R. W. 1976. Further results on the mean square error of ridge regression. Journal of the Royal Statistical Society. Series B (Methodological) 38 (3):248–50. doi:10.1111/j.2517-6161.1976.tb01588.x.
  • Hoerl, A. E, and R. W. Kennard. 1970. Ridge regression: Biased estimation for nonorthogonal problems. Technometrics 12 (1):55–67. doi:10.1080/00401706.1970.10488634.
  • Hoerl, A. E., R. W. Kennard, and K. Baldwin. 1975. Ridge regression: Some simulations. Communications in Statistics - Simulation and Computation 4 (2):105–23. doi:10.1080/03610917508548342.
  • Khalaf, G, and G. Shukur. 2005. Choosing ridge parameter for regression problems. Communications in Statistics - Theory and Methods 34 (5):1177–82. doi:10.1081/STA-200056836.
  • Kibria, B. M. G, and S. Banik. 2016. Some ridge regression estimators and their performances. Journal of Modern Applied Statistical Methods 15 (1):206–38. doi:10.22237/jmasm/1462075860.
  • Kibria, B. M. G. 2012. Some Liu and ridge-type estimators and their properties under the ill-conditioned Gaussian linear regression model. Journal of Statistical Computation and Simulation 82 (1):1–17. doi:10.1080/00949655.2010.519705.
  • Kibria, B. M. G., K. Månsson, and G. Shukur. 2012. Performance of some logistic ridge regression estimators. Computational Economics 40 (4):401–14. doi:10.1007/s10614-011-9275-x.
  • 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, and A. F. Lukman. 2020. A new ridge-type estimator for the linear regression model: Simulations and applications. Scientifica 2020:9758378. doi:10.1155/2020/9758378.
  • Liu, K. 1993. A new class of biased estimate in linear regression. Communications in Statistics – Theory and Methods 22:393–402.
  • Lukman, A. F., Z. Y. Algamal, B. M. G. Kibria, and K. Ayinde. 2021. The KL estimator for the inverse gaussian regression model. Concurrency and Computation Practice and Experience 33 (13):e6222. doi:10.1002/cpe.6222.
  • Lukman, A. F., K. Ayinde, S. K. Sek, and E. Adewuyi. 2019. A modified new two-parameter estimator in a linear regression model. Modelling and Simulation in Engineering 2019:1–10. doi:10.1155/2019/6342702.
  • Lukman, A. F., B. M. G. Kibria, K. Ayinde, and S. L. Jegede. 2020. Modified one-parameter Liu estimator for the linear regression model. Modelling and Simulation in Engineering 2020:1–17. doi:10.1155/2020/9574304.
  • Lukman, A. F, and K. Ayinde. 2016. Review and classifications of the ridge parameter estimation techniques. Hacettepe Journal of Mathematics and Statistics 46 (113):1–967. doi:10.15672/HJMS.201815671.
  • 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.
  • Månsson, K. 2012. On ridge estimators for the negative binomial regression model. Economic Modelling 29 (2):178–84. doi:10.1016/j.econmod.2011.09.009.
  • Månsson, K. B. M. G. Kibria, P. Sjölander, G. Shukur, and V. Sweden. 2011. New Liu Estimators for the Poisson Regression Model. Method App (No. 51). Sweden: HUI Research.
  • Månsson, K. 2013. Developing a Liu estimator for the negative binomial regression model: Method and application. Journal of Statistical Computation and Simulation 83 (9):1773–80. doi:10.1080/00949655.2012.673127.
  • McDonald, G. C, and D. I. Galarneau. 1975. A Monte Carlo evaluation of some ridge-type estimators. Journal of the American Statistical Association 70 (350):407–16. doi:10.1080/01621459.1975.10479882.
  • Meloun, M, and J. Militký. 2001. Detection of single influential points in OLS regression model building. Analytica Chimica Acta 439 (2):169–91. doi:10.1016/S0003-2670(01)01040-6.
  • Muniz, G, and B. M. G. Kibria. 2009. On some ridge regression estimators: An empirical comparisons. Communications in Statistics - Simulation and Computation 38 (3):621–30. doi:10.1080/03610910802592838.
  • Qasim, M., M. Amin, and M. Amanullah. 2018. On the performance of some new Liu parameters for the gamma regression model. Journal of Statistical Computation and Simulation 88 (16):3065–80. doi:10.1080/00949655.2018.1498502.
  • 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.
  • Trenkler, G, and H. Toutenburg. 1990. Mean squared error matrix comparisons between biased estimators-An overview of recent results. Statistical Papers 31 (1):165–79. doi:10.1007/BF02924687.
  • Varathan, N, and P. Wijekoon. 2016. On the restricted almost unbiased ridge estimator in logistic regression. Open Journal of Statistics 6 (6):1076–84. doi:10.4236/ojs.2016.66087.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.