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COMPARISONS OF SERIES AND PARALLEL SYSTEMS WITH HETEROGENEOUS COMPONENTS

Published online by Cambridge University Press:  19 November 2013

Weiyong Ding ,
Gaofeng Da  and
Xiaohu Li
Weiyong Ding
Affiliation:
College of Science, Hebei United University, Tangshan 063009, China
Gaofeng Da
Affiliation:
Department of Statistics and Finance, University of Science and Technology of China, Hefei 230026, China
Xiaohu Li
Affiliation:
School of Mathematical Sciences, Xiamen University, Xiamen 361005, China. E-mail: [email protected]
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Abstract

This paper carries out stochastic comparisons of series and parallel systems with independent and heterogeneous components in the sense of the hazard rate order, the reversed hazard rate order, and the likelihood ratio order. The main results extend and strengthen the corresponding ones by Misra and Misra [18] and by Ding, Zhang, and Zhao [8]. Meanwhile, the results on the hazard rate order of parallel systems and the reversed hazard order of series systems serve as nice supplements to Theorem 16.B.1 of Boland and Proschan [4] and Theorem 3.2 of Nanda and Shaked [20], respectively.

Type
Research Article
Information
Probability in the Engineering and Informational Sciences , Volume 28 , Issue 1 , January 2014 , pp. 39 - 53
Copyright
Copyright © Cambridge University Press 2013 

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References

1.Bapat, R.B. & Beg, M.I. (1989). Order statistics for nonidentically distributed variables and permanents. Sankhy Series A 51: 7893.Google Scholar
2.Bapat, R.B. & Kochar, S.C. (1994). On likelihood-ratio ordering of order statistics. Linear Algebra and Its Applications 199: 281291.CrossRefGoogle Scholar
3.Boland, P.J., El-Neweihi, E. & Proschan, F. (1994). Applications of hazard rate ordering in reliability and order statistics. Journal of Applied Probability 31: 180192.CrossRefGoogle Scholar
4.Boland, P.J. & Proschan, F. (1994). Stochastic order in system reliability theory. In: Stochastic Orders and Their Applications. Shaked, M. & Shanthikumar, J.G. (ed.). Boston: Academic Press, pp. 485508.Google Scholar
5.Bon, J.L. & Păltănea, E. (2006). Comparisons of order statistics in a random sequence to the same statistics with i.i.d. variables. ESAIM: Probability and Statistics 10: 110.CrossRefGoogle Scholar
6.Da, G., Ding, W. & Li, X. (2010). On hazard rate ordering of parallel systems with two independent components. Journal of Statistical Planning and Inference 140: 21482154.CrossRefGoogle Scholar
7.Ding, W. & Li, X. (2012). The optimal allocation of active redundancies to k-out-of-n systems with respect to hazard rate ordering. Journal of Statistical Planning and Inference 142: 18781887.CrossRefGoogle Scholar
8.Ding, W., Zhang, Y. & Zhao, P. (2013). Comparisons of k-out-of-n systems with heterogenous components. Statistics and Probability Letters 83: 493502.CrossRefGoogle Scholar
9.Dykstra, R., Kochar, S.C. & Rojo, J. (1997). Stochastic comparisons of parallel systems of heterogeneous exponential components. Journal of Statistical Planning and Inference 65: 203211.CrossRefGoogle Scholar
10.Hu, T., Lu, Q. & Wen, S. (2008). Some new results on likelihood ratio orderings for spacings of heterogeneous exponential random variables. Communications in Statistics: Theory and Methods 37: 25062515.CrossRefGoogle Scholar
11.Hu, T., Wang, F. & Zhu, Z. (2006). Stochastic comparisons and dependence of spacings from two samples of exponential random variables. Communications in Statistics: Theory and Methods 35: 979988.CrossRefGoogle Scholar
12.Hu, T., Zhu, Z. & Wei, Y. (2001). Likelihood ratio and mean residual life order of order statistics with heterogenous random variables. Probability in the Engineering and Informational Sciences 15: 259272.CrossRefGoogle Scholar
13.Joo, S. & Mi, J. (2010). Some properties of hazard rate functions of systems with two components. Journal of Statistical Planning and Inference 140: 444453.CrossRefGoogle Scholar
14.Khaledi, B.E., Farsinezhad, S. & Kochar, S.C. (2011). Stochastic comparisons of order statistics in the scale models. Journal of Statistical Planning and Inference 141: 276286.CrossRefGoogle Scholar
15.Khaledi, B.E. & Kochar, S.C. (2000). Some new results on stochastic comparisons of parallel systems. Journal of Applied Probability 37: 283291.CrossRefGoogle Scholar
16.Kochar, S.C. & Rojo, J. (1996). Some new results on stochastic comparisons of spacings from heterogeneous exponential distributions. Journal of Multivariate Analysis 59: 272281.CrossRefGoogle Scholar
17.Kochar, S.C. & Xu, M. (2007). Stochastic comparisons of parallel systems when components have proportional hazard rates. Probability in the Engineering and Informational Sciences 21: 597609.CrossRefGoogle Scholar
18.Misra, N. & Misra, A.K. (2012). New results on stochastic comparisons of two-component series and parallel systems. Statistics and Probability Letters 82: 283290.CrossRefGoogle Scholar
19.Müller, A. & Stoyan, D. (2002). Comparison methods for stochastic models and risks. New York: Wiley.Google Scholar
20.Nanda, A.K. & Shaked, M. (2001). The hazard rate and the reversed hazard rate orders, with applications in order statistics. Annals of the Institute of Statistical Mathematics 53: 853864.CrossRefGoogle Scholar
21.Navarro, J. & Shaked, M. (2006). Hazard rate ordering of order statistics and system. Journal of Applied Probability 43: 391408.CrossRefGoogle Scholar
22.Pledger, P. & Proschan, F. (1971). Comparisons of order statistics and of spacings from heterogeneous distributions. In: Optimizing Methods in Statistics. Rustagi, J.S. (ed.). New York: Academic Press, pp. 89113.Google Scholar
23.Proschan, F. & Sethuraman, J. (1976). Stochastic comparisons of order statistics from heterogeneous populations, with applications in reliability. Journal of Multivariate Analysis 6: 608616.CrossRefGoogle Scholar
24.Shaked, M. & Shanthikumar, J.G. (2007). Stochastic orders. New York: Springer-Verlag.CrossRefGoogle Scholar
25.van Lint, J.H. (1981). Notes on Egoritsjev's proof of the van der Waerden conjecture. Linear Algebra and Its Applications 39: 18.CrossRefGoogle Scholar
26.Wen, S., Lu, Q. & Hu, T. (2007). Likelihood ratio order of spacings from two samples of exponential distributions. Journal of Multivariate Analysis 98: 743756.CrossRefGoogle Scholar
27.Zhao, P. & Balakrishnan, N. (2011). Some characterization results for parallel systems with two heterogeneous exponential components. Statistics 45: 593604.CrossRefGoogle Scholar
28.Zhao, P., Li, X. & Balakrishnan, N. (2009). Likelihood ratio order of the second order statistic from independent heterogeneous exponential random variables. Journal of Multivariate Analysis 100: 952962.CrossRefGoogle Scholar