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The rate of occurrence of failures

Published online by Cambridge University Press:  14 July 2016

Lam Yeh*
Affiliation:
The Chinese University of Hong Kong
*
Postal address: Department of Statistics, The Chinese University of Hong Kong, Shatin, NT, Hong Kong.

Abstract

In this article, we assume that the state of a system forms a continuous-time Markov chain or a higher-dimensional Markov process after introducing some supplementary variables. A formula for evaluating the rate of occurrence of failures for the system is derived. As an application of the theory, a maintenance model for a two-component system is also studied.

Type
Research Papers
Copyright
Copyright © Applied Probability Trust 1997 

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References

Belayev, Yu. K. (1970) Elements of the General Theory of Random Streams of Events. Institute of Statistics, University of North Carolina at Chapel Hill, Mimeo Series No. 703.Google Scholar
Cao, J. H. and Chen, K. (1986) Introduction to Reliability Mathematics. Science Press, Beijing.Google Scholar
Iyer, R. K. and Downs, T. (1978) A moment approach to evaluation and optimization of complex system reliability. IEEE Trans. Reliab. R-26, 226229.CrossRefGoogle Scholar
Khan, N. M., Rajamani, K. and Banerji, S. K. (1977) A direct method to calculate the frequency and duration of failures for large networks. IEEE Trans. Reliab. R-26, 318321.Google Scholar
Lam, Y. (1995) Calculating the rate of occurrence of failures for continuous-time Markov chains with application to a two-component parallel system. J. Operat. Res. Soc. 46, 528536.Google Scholar
Lam, Y. and Zhang, Y. L. (1996) Analysis of a two-component series system with a geometric process model. Naval Res. Logist. 43, 491502.Google Scholar
Ross, S. M. (1970) Applied Probability Models with Optimization Applications. Holden-Day, San Francisco.Google Scholar
Shi, D. (1985) A new method for calculating the mean failure numbers of a repairable system during (0, t]. Acta Math. Appl. Sinica 8, 101110.Google Scholar
Singh, C. (1979) Calculating the time-specific frequency of system failure. IEEE Trans. Reliab. R-28, 124126.Google Scholar
Singh, C. (1981) Rules for calculating the time-specific frequency of system failure. IEEE Trans. Reliab. R-30, 364366.CrossRefGoogle Scholar
Singh, C. and Billinton, R. (1974) A new method to determine the failure frequency of a complex system. IEEE Trans. Reliab. R-23, 231234.Google Scholar