Advanced search
Publication Cover
Journal of Statistical Computation and Simulation Volume 94, 2024 - Issue 8
Submit an article Journal homepage
161
Views
0
CrossRef citations to date
0
Altmetric
Research Article

New ridge parameter estimators for the zero-inflated Conway Maxwell Poisson ridge regression model

Bushra AshrafDepartment of Statistics, University of Sargodha, Sargodha, Pakistan
,
Muhammad AminDepartment of Statistics, University of Sargodha, Sargodha, PakistanCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-7431-5756
ORCID Icon &
Muhammad Nauman AkramDepartment of Statistics, University of Sargodha, Sargodha, PakistanORCID Iconhttps://orcid.org/0000-0001-6688-808X
ORCID Icon
Pages 1814-1840 | Received 20 Dec 2022, Accepted 09 Jan 2024, Published online: 22 Jan 2024

References

  • Conway RW, Maxwell WL. A queuing model with state dependent service rates. J Ind Eng Int. 1962;12(2):132–136.
  • Shmueli G, Minka TP, Kadane JB, et al. A useful distribution for fitting discrete data: revival of the conway–Maxwell–poisson distribution. J R Stat Soc Ser C Appl Stat. 2005;54(1):127–142.
  • Ridout M, Demetrio CGB, Hinde J. Models for count data with many zeros. Invited paper presented at the Nineteenth International Biometric Conference, Cape Town, South Africa. 1998;179-190.
  • Lambert D. Zero-Inflated Poisson regression, with an application to defects in manufacturing. Technometrics. 1992;34(1):1–14.
  • Hall D. Zero-inflated poisson and binomial regression with random effects: a case study. Biom J. 2000;56(4):1030–1039.
  • Lee AH, Wang K, Yau KK. Analysis of zero-inflated Poisson data incorporating extent of exposure. Biomet J. 2001;43(1):963–975.
  • Qasim M, Kibria BMG, Månsson K, et al. A new Poisson Liu regression estimator: method and application. J App Stat. 2020;47(12):2258–2271.
  • Amin M, Qasim M, Amanullah M, et al. Performance of some ridge estimators for the gamma regression model. Stat Pap. 2020; 61:997–1026.
  • Hoerl AE, Kennard RW. Ridge regression: biased estimation for non-orthogonal problems. Technometrics. 1970a;12(1):55–67.
  • Hoerl AE, Kennard RW, Baldwin KF. Ridge regression: some simulation. Commun Stat – Simul Comput. 1975;4:105–123.
  • McDonald GC, Galarneau DI. A Monte Carlo evaluation of some ridge-type estimators. J Am Stat Assoc. 1975;70(350):407–416.
  • Kibria BMG. Performance of some new ridge regression estimators. Commun Stat – Simul Comput. 2003;32(2):419–435.
  • Khalaf G, Shukur G. Choosing ridge parameter for regression problems. Commun Stat Theory Methods. 2005;34(5):1177–1182.
  • Muniz G, Kibria BMG. On some ridge regression estimators: empirical comparisons. Commun Stat Simul Comput. 2009;38(3):621–630.
  • Månsson K, Shukur G. A Poisson ridge regression estimator. Econ Model. 2011;28(4):1475–1481.
  • Månsson K. On ridge estimators for the negative binomial regression model. Econ Model. 2012;29(2):178–184.
  • Kibria BMG, Månsson K, Shukur G. Performance of some logistic ridge regression estimators. Comput Econ. 2012; 40(1):401–414.
  • Amin M, Qasim M, Yasin A, et al. Almost unbiased ridge estimator in the gamma regression model. Commun Stat Simul Comput. 2022;51(7):3830–3850.
  • Algamal ZY. Developing a ridge estimator for the gamma regression model. J Chemometr. 2018a;32(10):e3054–e3012.
  • Algamal ZY. A new method for choosing the biasing parameter in ridge estimator for generalized linear model. Chemometr Intell Lab Syst. 2018b;183:96–101.
  • Algamal ZY. Performance of ridge estimator in inverse Gaussian regression model. Commun Stat Theory Methods. 2019;48(15):3836–3849.
  • Amin M, Qasim M, Afzal S, et al. New ridge estimators in the inverse Gaussian regression: Monte Carlo simulation and application to chemical data. Commun Stat Simul Comput. 2020;51(10):6170–6187.
  • Lemonte AJ, Arenas GM, Castellares F. Zero-inflated bell regression models for count data. J App Stat. 2020;47(2):265–286.
  • Omer T, Sjölande P, Månsson K. Kibria BMG.improved estimators for the zero-inflated Poisson regression model in the presence of multicollinearity: simulation and application of maternal death data. Commun Stat. Case Stud. Data Anal Appl. 2021;7(3):394–412.
  • Rady EHA, Abonazel MR, Taha IM. A new biased estimator for zero-inflated count regression models. J Mod Appl Stat Methods. 2019, https://www.researchgate.net/publication/337155202.
  • Kibria BMG, Månsson K, Shukur K. Some ridge regression estimators for the zero-inflated Poisson model. J Appl Stat. 2013;40(4):721–735.
  • Al-Taweel Y, Algamal Z. Some almost unbiased ridge regression estimators for the zero-inflated negative binomial regression model. Period Eng Nat Sci. 2020;8(1):248–255.
  • Akram MN, Abonazel MR, Amin M, et al. A new Stein estimator for the zero-inflated negative binomial regression model. Concurr Comput Pract Exp. 2022;34(19):1–14.
  • Akram MN, Afzal N, Amin M, et al. Modified ridge-type estimator for the zero inflated negative binomial regression model. Commun Stat - Simul Comput. 2023; doi:10.1080/03610918.2023.2179070.
  • Akram MN, Amin M, Afzal N, et al. Kibria–Lukman estimator for the zero inflated negative binomial regression model: theory, simulation and applications. Commun Stat - Simul Comput. 2023, doi:10.1080/03610918.2023.2286436.
  • Guikema SD, Goffelt JP. A flexible count data regression model for risk analysis. Risk Anal. 2008;28(1):213–223.
  • Nanjundan G. An EM algorithmic approach to maximum likelihood estimation in a mixture model. Vign Bhar. 2006;18(1):7–1.
  • Nelder JA, Mead RA. Simplex method for function minimization. Comput J. 1965;7(4):308–313.
  • Sami F, Amin M, Butt MM. On the ridge estimation of the Conway-Maxwell Poisson regression model with multicollinearity: methods and applications. Concurr Comput Pract Exp. 2022;34(1):e6477.
  • Sellers KF, Raim A. A flexible zero-inflated model to address data dispersion. Comput Stat Data Anal. 2016;99:68–80.
  • Abonazel MR. New modified two-parameter Liu estimator for the Conway–Maxwell Poisson regression model. J Stat Comput Sim. 2023: 1–20.
  • Hoerl AE, Kennard RW. Ridge regression: application to non orthogonal problems. Technometrics. 1970b;12(1):69–82.
  • Farebrother RW. Further results on the mean square error of ridge regression. J R Stat Soc. 1976;38(3):248–250.
  • Mustafa S, Amin M, Akram MN, et al. On the performance of some link functions in beta regression model: simulation and application. Concurr Comput Pract Exp. 2022;34(18):e7005.
  • Schaeffer RL, Roi LD, Wolfe RA. A ridge logistic estimator. Commun Stat Theory Methods. 1984;13:99–113.
  • Lukman AF, Dawoud I, Kibria BMG. A new ridge-type estimator for the gamma regression model. Scient. 2021: 5545356.
  • Akram MN, Kibria BMG, Abonazel MR, et al. On the performance of some biased estimators in the gamma regression model: simulation and applications. J Stat Comput Simul. 2022;92(12):2425–2447.
  • Kibria BMG. More than hundred (100) estimators for estimating the shrinkage parameter in a linear and generalized linear ridge regression models. J Econ Stat. 2022;2(2):233–252.
  • Amin M, Akram MN, Majid A. On the estimation of Bell regression model using ridge estimator. Commun Stat - Simul Comput. 2023; 52(3):854–867.

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.