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Communications in Statistics - Simulation and Computation Volume 49, 2020 - Issue 4
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Original Articles

A simulation study for count data models under varying degrees of outliers and zeros

Fatih TüzenTURKSTAT, Ankara, Turkey; Correspondence[email protected]
,
Semra ErbaşDepartment of Statistics, Faculty of Sciences, Gazi University, Ankara, Turkey
&
Hülya OlmuşDepartment of Statistics, Faculty of Sciences, Gazi University, Ankara, Turkey
Pages 1078-1088 | Received 05 Oct 2017, Accepted 05 Jul 2018, Published online: 18 Dec 2018

References

  • Afifi, A. A., J. B. Kotlerman, S. L. Ettner, and M. Cowan. 2007. Methods for improving regression analysis for skewed continuous or counted responses. Annual Review of Public Health 28:95–111.
  • Atkins, D., and R. Gallop. 2007. Rethinking how family researchers model infrequent outcomes: A tutorial on count regression and zero-inflated models. Journal of Family Psychology 21 (4):726–35.
  • Bandyopadhyay, D., S. DeSantis, J. Korte, and K. Brady. 2011. Some considerations for excess zeroes in substance abuse research. American Journal of Drug and Alcohol Abuse 37 (5):376–82.
  • Bohning, D., E. Dietz, P. Schlattmann, L. Mendonca, and U. Kirchner. 1999. The zero-inflated Poisson model and the decayed, missing and filled teeth index in dental epidemiology. Journal of the Royal Statistical Society (Series A, Statistics in Society), 162 (2):195–209.
  • Burnham, K. P., and D. R. Anderson. 2004. Multimodel inference: understanding AIC and BIC in model selection. Sociological Methods & Research 33:261–304.
  • Buu, A., N. Johnson, R. Li, and X. Tan. 2011. New variable selection methods for zero-inflated count data with applications to the substance abuse field. Statistics in Medicine 30:2326–40.
  • Cameron, A. C., and P. K. Trivedi. 2013. Regression Analysis of Count Data, 2nd ed. NewYork: Cambridge University Press.
  • Coxe, S., S. G. West, and L. S. Aiken. 2009. The analysis of count data: A gentle introduction to Poisson regression and its alternatives. Journal of Personality Assessment 91:121–36.
  • Fagundes, R. A. A., R. M. C. R. Souza, and F. J. A. Cysneiros. 2016. Zero-inflated prediction model in software-fault data. The Institution of Engineering and Technology, 10 (1):1–9.
  • Greene, W. H. 1994. Accounting for Excess Zeros and Sample Selection in Poisson and Negative Binomial Regression Models (March). NYU Working Paper No. EC-94-10. Available at: https://ssrn.com/abstract=1293115.
  • Guo, F., G. Wang, J. L. Innes, Z. Ma, and A. Liu. 2016. Comparison of six generalized linear models for occurrence of lightning-induced fires in northern Daxing’an Mountains, China. Journal of Forestry Research 27 (2):379–88.
  • Hassankiadeh, R. F., A. Kazemnejad, M. G. Fesharaki, and S. K. Jahromi. 2018. Efficiency of zero-inflated generalized poisson regression model on hospital length of stay using real data and simulation study. Caspian Journal of Health Research 3 (1):5–9.
  • Heilborn, D. 1989. Generalized Linear Models for Altered Zero Probability in Count Data, Technical Report, Department of Epidemiology and Biostatistics, University of California, San Francisco.
  • Hilbe, J. M. 2011. Negative Binomial Regression. NewYork: Cambridge University Press.
  • Hu, M., M. Pavlicova, and E. Nunes. 2011. Zero-inflated and hurdle models of count data with extra zeros: Examples from an HIV-risk reduction intervention trial. American Journal of Drug and Alcohol Abuse 37 (5):367–75.
  • Lambert, D. 1992. Zero-inflated Poisson regression with an application to detects in manufacturing. Technometrics 34:1–14.
  • Lee, A. H., K. Wang, and K. K. W. Yau. 2001. Analysis of zero-inflated Poisson data incorporating extent of exposure. Biometrical Journal 43:963–75.
  • Min, Y., and A. Agresti. 2005. Random effect models for repeated measures of zero-inflated count data. Statistical Modeling 5:1–19.
  • Mullahy, J. 1986. Specification and testing of some modified count data models. Journal of Econometrics 33:341–65.
  • Pardoe, I., and C. A. Durham. 2003. Model choice applied to consumer preferences. In Proceedings of the 2003 Joint Statistical Meetings, Alexandria, VA, American Statistical Association.
  • R Development Core Team. 2016. R: A Language and Environment for Statistical Computing. Vienna, Austria: R foundation for Statistical Computing. Available at: http://www.R-project.org/
  • Rose, C., S. Martin, K. Wannemuehler, and B. Plikaytis. 2006. On the use of zero-inflated and hurdle models for modeling vaccine adverse event count data. Journal of Biopharmaceutical Statistics 16 (4):463–81.
  • Sakthivel, K. M., and C. S. Rajitha. 2017. A comparative study of zero-inflated, hurdle odels with artificial neural network in claim count modeling. International Journal of Statistics and Systems 12 (2):265–76.
  • Slymen, D. J., G. X. Ayala, E. M. Arredondo, and J. P. Elder. 2006. A demonstration of modeling count data with an application to physical activity. Epidemiologic Perspectives & Innovations 3:1–9.
  • Tüzen, M. F., and S. Erbaş. 2017. A comparison of count data models with an application to daily cigarette consumption of young persons. Communications in Statistics – Theory and Methods 47 (23):5825–44. doi:10.1080/03610926.2017.140205010.
  • Usman, M., and B. A. Oyejola. 2013. Models for Count Data in the Presence of Outliers and/or Excess Zero. Mathematical Theory and Modeling 3 (7):94–103.
  • Wanjau, A. N., S. M. Mwalili, and O. Ngesa. 2018. Assessment and selection of competing models for count data: an application to early childhood caries. International Journal of Data Science and Analysis 4 (1):24–31.
  • Welsh, A. H., R. B. Cunningham, C. F. Donnelly, and D. B. Lindenmayer. 1996. Modelling abundance of rare species: Statistical models for counts with extra zeros. Ecological Modelling 88:297–308.
  • Williamson, J. M., H. Lin, R. H. Lyles, and A. W. Hightower. 2007. Power calculations for ZIP and ZINB models. Journal of Data Science 5 (4):519–34.
  • Xie, H., J. Tao, G. J. McHugo, and R. E. Drake. 2013. Comparing statistical methods for analyzing skewed longitudinal count data with many zeros: An example of smoking cessation. Journal of Substance Abuse Treatment 45:99–108.
  • Yang, J., M. Xie, and T. N. Goh. 2009. Outlier identification and robust parameter estimation in a zero-inflated Poisson model. Journal of Applied Statistics 38 (2):421–30.
  • Yang, S., G. Puggioni, L. L. Harlow, C. A. Redding. 2017. A comparison of different methods of zero-inflated data analysis and an application in health surveys. Journal of Modern Applied Statistical Methods 16 (1):518–43.
  • Zorn, C. J. W. 1996. Evaluating zero-inflated and hurdle Poisson specifications. Midwest Political Science Association, 1–16.

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