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Communications in Statistics - Theory and Methods Volume 48, 2019 - Issue 9
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Original Articles

Closure property of consistently varying random variables based on precise large deviation principles

Shijie WangSchool of Mathematical Sciences, Anhui University, Hefei, Anhui, ChinaCorrespondence[email protected]
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,
Duo GuoSchool of Mathematical Sciences, Anhui University, Hefei, Anhui, ChinaView further author information
&
Wensheng WangSchool of Economics, Hangzhou Dianzi University, Hangzhou, ChinaView further author information
Pages 2218-2228 | Received 19 Jan 2018, Accepted 05 Mar 2018, Published online: 16 Apr 2018

References

  • Albin, J. M. P. 2008. A note on the closure of convolution power mixtures (random sums) of exponential distributions. J. Aust. Math. Soc. 84:1–7.
  • Bingham, N. H., C. M. Goldie, and J. L. Teugels. 1987. Regular variation. Cambridge: Cambridge University Press.
  • Chen, Y., and K. C. Yuen. 2009. Sums of pairwise quasi-asymptotically independent random variables with consistent variation. Stoch. Model. 25:76–89.
  • Chen, Y., K. W. Ng, and K. C. Yuen. 2011. The maximum of randomly weighted sums with long tails in insurance and finance. Stoch. Anal. Appl. 29:1033–44.
  • Cline, D. B. H. 1987. Convolutions of distributions with exponential and subexponential tails. J. Aust. Math. Soc. A 43:347–65.
  • Danilenko, S., and J. Šiaulys. 2016. Randomly stopped sums of not identically distributed heavy tailed random variables. Stat. Probab. Lett. 113:84–93.
  • Danilenko, S., S. Paškauskaitė, and J. Šiaulys. 2016. Random convolution of inhomogeneous distributions with O exponential tail. Mod. Stoch., Theory Appl. 3:79–94.
  • Embrechts, P., and C. M. Goldie. 1982. On convolution tails. Stoch. Process. Appl. 13:263–78.
  • Kizinevič, E., J. Sprindys, and J. Šiaulys. 2016. Randomly stopped sums with consistently varying distributions. Mod. Stoch., Theory Appl. 3:165–79.
  • Leipus, R., and J. Šiaulys. 2012. Closure of some heavy-tailed distribution classes under random convolution. Lith. Math. J. 52:249–58.
  • Leipus, R., and J. Šiaulys. 2017. On the random max-closure for heavy-tailed random variables. Lith. Math. J. 57:208–21.
  • Liu, L. 2009. Precise large deviations for dependent random variables with heavy tails. Stat. Prob. Lett. 79 (9):1290–98.
  • Manstavičius, I. M. Andrulytė, M., and J. Šiaulys. 2017. Randomly stopped maximum and maximum of sums with consistently varying distributions. Mod. Stoch., Theory Appl. 4:65–78.
  • Watanabe, T., and K. Yamamuro. 2010. Ratio of the tail of an infinitely divisible distribution on the line to that of its Lévy measure. Electron. J. Probab. 15:44–75.
  • Xu, H., S. Foss, and Y. Wang. 2015. Convolution and convolution-root properties of long-tailed distributions. Extremes 18:605–28.

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