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A Journal of Theoretical and Applied Statistics
Volume 58, 2024 - Issue 2
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Research Article

Poisson-modification of the Quasi Lindley optimal generalized regression estimator

Ramajeyam Tharshana Postgraduate Institute of Science, University of Peradeniya, Peradeniya, Sri Lanka;b Department of Mathematics and Statistics, University of Jaffna, Jaffna, Sri LankaCorrespondence[email protected]
&
Pushpakanthie Wijekoonc Department of Statistics and Computer Science, University of Peradeniya, Peradeniya, Sri Lanka
Pages 247-276 | Received 15 Apr 2022, Accepted 16 Mar 2024, Published online: 25 Mar 2024

References

  • Greenwood M, Yule GU. An inquiry into the nature of frequency distributions representative of multiple happenings with particular reference to the occurrence of multiple attacks of disease or of repeated accidents. J Royal Statist Soc. 1920;83:255–279. doi: 10.2307/2341080
  • Shoukri MM, Asyali MH, VanDorp R, et al. The Poisson inverse Gaussian regression model in the analysis of clustered counts data. J Data Sci. 2004;2:17–32. doi: 10.6339/JDS.2004.02(1).135
  • Zamani H, Ismail N, Faroughi P. Poisson-weighted exponential univariate version and regression model with applications. J Math Statist. 2014;10:148–154. doi: 10.3844/jmssp.2014.148.154
  • Wongrin W, Bodhisuwan W. Generalized Poisson-Lindley linear model for count data. J Appl Stat. 2016;44:2659–2671. doi: 10.1080/02664763.2016.1260095
  • Altun E. A new model for over-dispersed count data: Poisson Quasi-Lindley regression model. Math Sci. 2019;13:241–247. doi: 10.1007/s40096-019-0293-5
  • Tzougas G. EM estimation for the Poisson-inverse gamma regression model with varying dispersion: an application to insurance ratemaking. Risks. 2020;8:97. doi: 10.3390/risks8030097
  • Tharshan R, Wijekoon P. Poisson-modification of Quasi Lindley regression model for over-dispersed count responses. Commun Statist – Simul Comput. 2022;53:1258–1273. doi: 10.1080/03610918.2022.2044052
  • Tharshan R, Wijekoon P. A modification of the Quasi Lindley distribution. Open J Stat. 2021;11:369–392. doi: 10.4236/ojs.2021.113022
  • Tharshan R, Wijekoon P. A new mixed Poisson distribution for over-dispersed count data: theory and applications. Reliability: Theory Appl. 2022;17:33–51.
  • Frisch R. Statistical confluence analysis by means of complete regression systems. Oslo: University Institute of Economics; 1934.
  • Tharshan R, Wijekoon P. Ridge estimator in a mixed Poisson regression model. Commun Statist – Simul Comput. 2022:1–18. doi: 10.1080/03610918.2022.2101064
  • Nomura M. On the almost unbiased ridge regression estimation. Commun Statist – Simul Comput. 1988;17:729–743. doi: 10.1080/03610918808812690
  • Muniz G, Kibria BMG. On some ridge regression estimators: an empirical comparisons. Commun Statist – Simul Comput. 2009;38:621–630. doi: 10.1080/03610910802592838
  • Tharshan R, Wijekoon P. On a mixed Poisson Liu regression estimator for over-dispersed and multicollinear count data. Sci World J. 2022;2022:8171461. doi: 10.1155/2022/8171461
  • Khalaf G, Shukur G. Choosing ridge parameters for regression problems. Commun Statist – Theory Methods. 2005;34:1177–1182. doi: 10.1081/STA-200056836
  • Slater LJ. Generalized hypergeometric functions. New York: Cambridge University Press; 1966.
  • Hoerl AE, Kennard RW. Ridge regression: biased estimation for nonorthogonal problems. Technometrics. 1970;12:55–67. doi: 10.1080/00401706.1970.10488634
  • Singh B, Chaubey YP, Dwivedi TD. An almost unbiased ridge estimator. Indian J Statist. 1986;48:342–346.
  • Liu K. A new class of biased estimate in linear regression. Commun Statist – Theory Methods. 1993;22:393–402. doi: 10.1080/03610929308831027
  • Akdeniz F, Kairanlar S. On the almost unbiased generalized Liu estimator and unbiased estimation of the bias and MSE. Commun Statist – Theory Methods. 1995;24:1789–1797. doi: 10.1080/03610929508831585
  • Rao CR, Toutenburg H. Linear models: least squares and alternatives. 2nd ed. New York: Springer-Verlag; 1995.
  • Newhouse JP, Oman SD. An evaluation of ridge estimators. Santa Monica: RAND Corporation; 1971.
  • Farebrother R. Further results on the mean square error of ridge regression. J R Statist Soc Ser B (Methodological). 1976;38:248–250.
  • McDonald GC, Galarneau DI. A Monte Carlo evaluation of some ridge-type estimators. J Am Stat Assoc. 1975;70:407–416. doi: 10.1080/01621459.1975.10479882
  • Månsson K. On ridge estimators for the negative binomial regression model. Econ Model. 2012;29:178–184. doi: 10.1016/j.econmod.2011.09.009
  • Månsson K. Developing a Liu estimator for the negative binomial regression model: method and application. J Stat Comput Simul. 2013;83:1773–1780. doi: 10.1080/00949655.2012.673127
  • Qasim M, Kibria BMG, Månsson K, et al. A new Poisson Liu regression estimator: method and application. J Appl Stat. 2019;47:2258–2271. doi: 10.1080/02664763.2019.1707485

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