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Communications in Statistics - Theory and Methods Volume 52, 2023 - Issue 5
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Article

Lack-of-partial-memory and aging properties of multivariate generalized Marshall-Olkin distributions

Jianhua Lina School of Mathematical Sciences, Xiamen University, Xiamen, Fujian, ChinaCorrespondence[email protected]
&
Xiaohu Lib Department of Mathematical Sciences, Stevens Institute of Technology, Hoboken, NJ, USA
Pages 1564-1579 | Received 17 May 2020, Accepted 12 May 2021, Published online: 01 Jun 2021

References

  • Anastasiadis, S., R. Arnold, S. Chukova, and Y. Hayakawa. 2013. Multicomponent systems with multiplicative aging and dependent failures. IEEE Transactions on Reliability 62 (1):286–95. doi:10.1109/TR.2013.2241152.
  • Anastasiadis, S., and S. Chukova. 2012. Multivariate insurance models: An overview. Insurance: Mathematics and Economics 51 (1):222–27. doi:10.1016/j.insmatheco.2011.01.013.
  • Bernhart, G., L. Fernández, J. Mai, S. Schenk, and M. Scherer. 2015. A survey of dynamic representations and generalizations of the Marshall-Olkin distribution. In Marshall-Olkin Distributions - Advances in Theory and Applications, eds. U. Cherubini, F. Durante, and S. Mulinacci, vol 141. Springer, Cham: Springer Proceedings in Mathematics & Statistics.
  • Brindley, E. C., and W. A. Thompson. 1972. Dependence and aging aspects of multivariate survival. Journal of the American Statistical Association 67 (340):822–30. doi:10.1080/01621459.1972.10481300.
  • Chukova, S., and B. Dimitrov. 1992. On distributions having the almost-lack-of-memory property. Journal of Applied Probability 29 (3):691–98. doi:10.2307/3214905.
  • Denuit, M., E. Frostig, and B. Levikson. 2006. Shifts in interest rate and common shock model for coupled lives. Belgian Actuarial Bulletin 6 (1):1–4.
  • Gobbi, F., N. Kolev, and S. Mulinacci. 2019. Joint life insurance pricing using extended Marshall-Olkin models. ASTIN Bulletin 49 (2):409–32. doi:10.1017/asb.2019.3.
  • Hu, T., B. Khaledi, and M. Shaked. 2003. Multivariate hazard rate orders. Journal of Multivariate Analysis 84 (1):173–89. doi:10.1016/S0047-259X(02)00019-2.
  • Kolev, N., and J. Pinto. 2018. Functional equations involving Sibuya’s dependence function. Aequationes Mathematicae 92 (3):441–51. doi:10.1007/s00010-018-0544-9.
  • Kulkarni, H. V. 2006. Characterizations and modelling of multivariate lack of memory property. Metrika 64 (2):167–80. doi:10.1007/s00184-006-0042-2.
  • Li, C., and X. Li. 2021. On stochastic dependence in residual lifetime and inactivity time with some applications. Statistics & Probability Letters. Advance online publication. doi:10.1016/j.spl.2021.109120.
  • Li, H. 2009. Orthant tail dependence of multivariate extreme value distributions. Journal of Multivariate Analysis 100 (1):243–56. doi:10.1016/j.jmva.2008.04.007.
  • Li, H., and X. Li. 2013. Stochastic orders in reliability and risk. New York: Springer.
  • Li, X., and F. Pellerey. 2011. Generalized Marshall-Olkin distributions and related bivariate aging properties. Journal of Multivariate Analysis 102 (10):1399–409. doi:10.1016/j.jmva.2011.05.006.
  • Lin, G. D. 1994. A note on distributions having the almost-lack-of-memory property. Journal of Applied Probability 31 (3):854–56. doi:10.2307/3215164.
  • Lin, J., and X. Li. 2014. Multivariate generalized Marshall-Olkin distributions and copulas. Methodology and Computing in Applied Probability 16 (1):53–78. doi:10.1007/s11009-012-9297-4.
  • Lindskog, F., and A. J. McNeil. 2003. Common Poisson shock models: Applications to insurance and credit risk modelling. ASTIN Bulletin 33 (2):209–38. doi:10.1017/S0515036100013441.
  • Longobardi, M., and F. Pellerey. 2019. On the role of dependence in residual lifetimes. Statistics & Probability Letters 153:56–64. doi:10.1016/j.spl.2019.05.010.
  • Marshall, A. W., and I. Olkin. 1967. A multivariate exponential distribution. Journal of the American Statistical Association 62 (317):30–44. doi:10.1080/01621459.1967.10482885.
  • Marshall, A. W., and I. Olkin. 1974. Majorization in multivariate distributions. The Annals of Statistics 2 (6):1189–200. doi:10.1214/aos/1176342873.
  • Marshall, A. W., and I. Olkin. 1988. Families of multivariate distributions. Journal of the American Statistical Association 83 (403):834–41. doi:10.1080/01621459.1988.10478671.
  • Muliere, P., and M. Scarsini. 1987. Characterization of a Marshall-Olkin type class of distributions. Annals of the Institute of Statistical Mathematics 39 (2):429–41. doi:10.1007/BF02491480.
  • Mulinacci, S. 2018. Archimedean-based Marshall-Olkin distributions and related dependence structures. Methodology and Computing in Applied Probability 20 (1):205–36. doi:10.1007/s11009-016-9539-y.
  • Müller, A., and D. Stoyan. 2002. Comparison methods for stochastic models and risks. West Sussex: Wiley.
  • Nappo, G., and F. Spizzichino. 2020. Relations between ageing and dependence for exchangeable lifetimes with an extension for the IFRA/DFRA property. Dependence Modeling 8 (1):1–33. doi:10.1515/demo-2020-0001.
  • Navarro, J., F. Pellerey, and M. A. Sordo. 2021. Weak dependence notions and their mutual relationships. Mathematics 9 (1):81.
  • Pinto, J. 2014. Deepening the notions of dependence and ageing in bivariate probability distributions. Ph.D. thesis., University of Sao Paulo.
  • Pinto, J., and N. Kolev. 2015a. Sibuya-type bivariate lack of memory property. Journal of Multivariate Analysis 134:119–28. doi:10.1016/j.jmva.2014.11.001.
  • Pinto, J., and N. Kolev. 2015b. Extended Marshall-Olkin model and its dual version. In Marshall-Olkin Distributions - Advances in Theory and Applications, eds. U. Cherubini, F. Durante, and S. Mulinacci, vol 141. Cham: Springer Proceedings in Mathematics & Statistics, Springer.
  • Shaked, M., and J. G. Shanthikumar. 2007. Stochastic orders. New York: Springer.
  • Sibuya, M. 1960. Bivariate extreme statistics I. Annals of the Institute of Statistical Mathematics 11 (3):195–210. doi:10.1007/BF01682329.
  • Spizzichino, F. 2001. Subjective probability models for lifetimes. Boca Raton: Chapman & Hall/CRC.

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