Reliability and risk analysis of multi-state systems with degrading components

Kołowrocki, K.

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Reliability and risk analysis of multi-state systems with degrading components

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Kołowrocki K.

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Abstrakty

Applications of multi-state approach to the reliability evaluation of systems composed of independent components are considered. The main emphasis is on multi-state systems with degrading components because of the importance of such an approach in safety analysis, assessment and prediction, and analysing the effectiveness of operation processes of real technical systems. The results concerned with multi-state series systems are applied to the reliability evaluation and risk function determination of a homogeneous bus transportation system. Results on homogeneous multi-state “m out of n” systems are applied to durability evaluation of a steel rope. A nonhomogeneous series-parallel pipeline system composed of several lines of multi-state pipe segments is estimated as well. Moreover, the reliability evaluation of the model homogeneous multi-state parallel-series electrical energy distribution system is performed.

Słowa kluczowe

multi-state systems system reliability system risk

Wydawca

Polskie Towarzystwo Bezpieczeństwa i Niezawodności

Czasopismo

Journal of Polish Safety and Reliability Association

Rocznik

2008

Tom

Vol. 2

Strony

205--216

Opis fizyczny

Bibliogr. 42 poz., rys., tab., wykr.

Twórcy

autor

Kołowrocki K.

Maritime University, Gdynia, Poland

Bibliografia

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[12] Ebrahimi, N. (1984). Multistate reliability models. Naval Res. Logistics 31, 671-680.
[13] El-Neweihi, E., Proschan, F. & Setchuraman, J. (1978). Multi-state coherent systems. J. Applied Probability 15, 675-688.
[14] Fardis, M. & Cornell, C. (1981). Analysis of coherent multi-state systems. IEEE Transactions on Reliability 30, 117-122.
[15] Griffith, W. (1980). Multi-state reliability models. J. Applied Probability 17, 735-744.
[16] Huang, J., Zuo, M. & Wu, Y. (2000). Generalized multi-state k-out-of-n:G systems. IEEE Transactions on Reliability 49, 105-111.
[17] Hudson, J. & Kapur, K. (1982). Reliability theory for multi-state systems with multistate components. Microelectronics and Reliability 22, 1-7.
[18] Hudson, J. & Kapur, K. (1983). Reliability analysis of multi-state systems with multi-state components. Transactions of Institute of Industrial Engineers 15, 127-135.
[19] Hudson, J. & Kapur, K. (1983). Modules in coherent multi-state systems. IEEE Transactions on Reliability 32, 183-185.
[20] Hudson, J. & Kapur, K. (1985). Reliability bounds for multi-state systems with multistate components. Operations Research 33, 735-744.
[21] Kołowrocki, K. (2004). Reliability of Large Systems. Elsevier: Amsterdam – Boston - Heidelberg - London - New York - Oxford - Paris - San Diego - San Francisco - Singapore - Sydney - Tokyo.
[22] Kossow, A. & Preuss, W. (1995). Reliability of linear consecutively-connected systems with multistate components. IEEE Transactions on Reliability 44, 518-522.
[23] Levitin, G., Lisnianski, A., Ben Haim, H. & Elmakis, D. (1998). Redundancy optimisation for multi-state series-parallel systems. IEEE Transactions on Reliability 47, 165-172.
[24] Levitin, G. & Lisnianski, A. (1998). Joint redundancy and maintenance optimisation for series-parallel multi-state systems. Reliability Engineering and System Safety 64, 33-42.
[25] Levitin, G. & Lisnianski, A. (1999). Importance and sensitivity analysis of multi-state systems using universal generating functions method. Reliability Engineering and System Safety 65, 271-282.
[26] Levitin, G. & Lisnianski, A. (2000). Optimisation of imperfect preventive maintenance for multi-state systems. Reliability Engineering and System Safety 67, 193-203.
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[28] Levitin, G. & Lisnianski, A. (2001). Structure optimisation of multi-state system with two failure modes. Reliability Engineering and System Safety 72, 75-89.
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[31] Natvig, B. (1982). Two suggestions of how to define a multi-state coherent system. Adv. Applied Probability 14, 434-455.
[32] Natvig, B. & Streller, A. (1984). The steady-state behaviour of multi-state monotone systems. J. Applied Probability 21, 826-835.
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[36] Polish Norm PN-68/M-80-200. Steel Ropes. Classification and Construction (in Polish).
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Bibliografia

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