Research Article
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Year 2021, , 1560 - 1571, 15.10.2021
https://doi.org/10.15672/hujms.784055

Abstract

References

  • [1] H. Ascher and H. Feingold, Repairable Systems Reliability: Modelling, Inference, Misconceptions and Their Causes, Marcel Dekker, 1984.
  • [2] J. Bai and H. Pham, Repair-limit risk-free warranty policies with imperfect repair, IEEE Trans. Syst., Man, Cybern. A, Syst. Humans 36 (6), 756–772, 2005.
  • [3] O.E. Barndorff-Nielsen and D.R. Cox, Inference and Asymptotics, Chapman and Hall, 1994.
  • [4] J.S. Chan, P.L. Yu, Y. Lam and A.P. Ho, Modelling SARS data using threshold geometric process, Stat. Med. 25 (11), 1826–1839, 2006.
  • [5] J.S. Chan, S.B. Choy and C.P. Lam, Modeling electricity price using a threshold conditional autoregressive geometric process jump model, Comm. Statist. Theory Methods 43 (1012), 2505-2515, 2014.
  • [6] U. Kumar and B. Klefsjö, Reliability analysis of hydraulic systems of LHD machines using the power law process model, Reliab. Eng. Syst. Saf. 35 (3), 217-224, 1992.
  • [7] Y. Lam, The Geometric Process and Its Applications, Word Scientific, 2007.
  • [8] M. Park and H. Pham, Warranty cost analyses using quasi-renewal processes for multicomponent systems, IEEE Trans. Syst., Man, Cybern. A, Syst. Human 40 (6), 1329-1340, 2010.
  • [9] H. Pham and H. Wang, A quasi-renewal process for software reliability and testing costs, IEEE Trans. Syst., Man, Cybern. A, Syst. Human 31 (6), 623–631, 2001.
  • [10] F. Proschan, Theoretical explanation of observed decreasing failure rate, Technometrics 42 (1), 7–11, 2000.
  • [11] H. Wang and H. Pham, A quasi-renewal process and its applications in imperfect maintenance, Internat. J. Systems Sci. 27 (10), 1055-1062, 1996.
  • [12] S. Wu, Doubly geometric process and applications, J. Oper. Res. Soc. 69 (1), 66–67, 2018.
  • [13] S. Wu and P. Scarf, Decline and repair, and covariate effects, European J. Oper. Res. 244 (1), 219-226, 2015.
  • [14] S.Wu and G. Wang, The semi-geometric process and some properties, IMA J. Manag. Math. 29 (2), 229-245, 2018.
  • [15] M. Zhang, M. Xie and O. Gaudoin, A bivariate maintenance policy for multi-state repairable systems with monotone process, IEEE Trans. Rel. 62 (4), 876-886, 2013.

Statistical inference for doubly geometric process with exponential distribution

Year 2021, , 1560 - 1571, 15.10.2021
https://doi.org/10.15672/hujms.784055

Abstract

The geometric process is widely applied as a stochastic monotone model in many practical applications since its introduction. However, it sometimes does not satisfy some requirements in the real-world applications due to model limitations. For this reason, it is proposed a new stochastic model which is called doubly geometric process. In the applications of the doubly geometric process, the estimation problem associated with the process arises naturally. In this study, the statistical inference problem for the doubly geometric process is considered by assuming that the distribution of the first interarrival time has an exponential distribution. The maximum likelihood method is used to estimate the model parameters of the doubly geometric process and the parameter of distribution. The joint distribution of the maximum likelihood estimators is obtained. A simulation study is presented to evaluate the small sample performance of the estimators with different parameter values. Finally, three real-world-data sets are used to illustrate the applicability of the methods.

References

  • [1] H. Ascher and H. Feingold, Repairable Systems Reliability: Modelling, Inference, Misconceptions and Their Causes, Marcel Dekker, 1984.
  • [2] J. Bai and H. Pham, Repair-limit risk-free warranty policies with imperfect repair, IEEE Trans. Syst., Man, Cybern. A, Syst. Humans 36 (6), 756–772, 2005.
  • [3] O.E. Barndorff-Nielsen and D.R. Cox, Inference and Asymptotics, Chapman and Hall, 1994.
  • [4] J.S. Chan, P.L. Yu, Y. Lam and A.P. Ho, Modelling SARS data using threshold geometric process, Stat. Med. 25 (11), 1826–1839, 2006.
  • [5] J.S. Chan, S.B. Choy and C.P. Lam, Modeling electricity price using a threshold conditional autoregressive geometric process jump model, Comm. Statist. Theory Methods 43 (1012), 2505-2515, 2014.
  • [6] U. Kumar and B. Klefsjö, Reliability analysis of hydraulic systems of LHD machines using the power law process model, Reliab. Eng. Syst. Saf. 35 (3), 217-224, 1992.
  • [7] Y. Lam, The Geometric Process and Its Applications, Word Scientific, 2007.
  • [8] M. Park and H. Pham, Warranty cost analyses using quasi-renewal processes for multicomponent systems, IEEE Trans. Syst., Man, Cybern. A, Syst. Human 40 (6), 1329-1340, 2010.
  • [9] H. Pham and H. Wang, A quasi-renewal process for software reliability and testing costs, IEEE Trans. Syst., Man, Cybern. A, Syst. Human 31 (6), 623–631, 2001.
  • [10] F. Proschan, Theoretical explanation of observed decreasing failure rate, Technometrics 42 (1), 7–11, 2000.
  • [11] H. Wang and H. Pham, A quasi-renewal process and its applications in imperfect maintenance, Internat. J. Systems Sci. 27 (10), 1055-1062, 1996.
  • [12] S. Wu, Doubly geometric process and applications, J. Oper. Res. Soc. 69 (1), 66–67, 2018.
  • [13] S. Wu and P. Scarf, Decline and repair, and covariate effects, European J. Oper. Res. 244 (1), 219-226, 2015.
  • [14] S.Wu and G. Wang, The semi-geometric process and some properties, IMA J. Manag. Math. 29 (2), 229-245, 2018.
  • [15] M. Zhang, M. Xie and O. Gaudoin, A bivariate maintenance policy for multi-state repairable systems with monotone process, IEEE Trans. Rel. 62 (4), 876-886, 2013.
There are 15 citations in total.

Details

Primary Language English
Subjects Statistics
Journal Section Statistics
Authors

Mustafa Hilmi Pekalp 0000-0002-5183-8394

Gültaç Eroğlu İnan 0000-0002-3099-9949

Halil Aydoğdu 0000-0001-5337-5277

Publication Date October 15, 2021
Published in Issue Year 2021

Cite

APA Pekalp, M. H., Eroğlu İnan, G., & Aydoğdu, H. (2021). Statistical inference for doubly geometric process with exponential distribution. Hacettepe Journal of Mathematics and Statistics, 50(5), 1560-1571. https://doi.org/10.15672/hujms.784055
AMA Pekalp MH, Eroğlu İnan G, Aydoğdu H. Statistical inference for doubly geometric process with exponential distribution. Hacettepe Journal of Mathematics and Statistics. October 2021;50(5):1560-1571. doi:10.15672/hujms.784055
Chicago Pekalp, Mustafa Hilmi, Gültaç Eroğlu İnan, and Halil Aydoğdu. “Statistical Inference for Doubly Geometric Process With Exponential Distribution”. Hacettepe Journal of Mathematics and Statistics 50, no. 5 (October 2021): 1560-71. https://doi.org/10.15672/hujms.784055.
EndNote Pekalp MH, Eroğlu İnan G, Aydoğdu H (October 1, 2021) Statistical inference for doubly geometric process with exponential distribution. Hacettepe Journal of Mathematics and Statistics 50 5 1560–1571.
IEEE M. H. Pekalp, G. Eroğlu İnan, and H. Aydoğdu, “Statistical inference for doubly geometric process with exponential distribution”, Hacettepe Journal of Mathematics and Statistics, vol. 50, no. 5, pp. 1560–1571, 2021, doi: 10.15672/hujms.784055.
ISNAD Pekalp, Mustafa Hilmi et al. “Statistical Inference for Doubly Geometric Process With Exponential Distribution”. Hacettepe Journal of Mathematics and Statistics 50/5 (October 2021), 1560-1571. https://doi.org/10.15672/hujms.784055.
JAMA Pekalp MH, Eroğlu İnan G, Aydoğdu H. Statistical inference for doubly geometric process with exponential distribution. Hacettepe Journal of Mathematics and Statistics. 2021;50:1560–1571.
MLA Pekalp, Mustafa Hilmi et al. “Statistical Inference for Doubly Geometric Process With Exponential Distribution”. Hacettepe Journal of Mathematics and Statistics, vol. 50, no. 5, 2021, pp. 1560-71, doi:10.15672/hujms.784055.
Vancouver Pekalp MH, Eroğlu İnan G, Aydoğdu H. Statistical inference for doubly geometric process with exponential distribution. Hacettepe Journal of Mathematics and Statistics. 2021;50(5):1560-71.

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