Doklady Mathematics.
Vol. 101.
2020.
P. 165-168
Renewal redundant systems under the Marshall-Olkin failure model. A probability analysis
In this paper a two component redundant renewable system operating under the Marshall-Olkin failure model is considered. The purpose of the study is to find analytical expressions for the time dependent and the steady state characteristics of the system. The system cycle process characteristics are analyzed by the use of probability interpretation of the Laplace-Stieltjes transformations (LSTs), and of probability generating functions (PGFs). In this way the long mathematical analytic derivations are avoid. As results of the investigations, the main reliability characteristics of the system-the reliability function and the steady state probabilities-have been found in analytical form. Our approach can be used in the studies of various applications of systems with dependent failures between their elements. © 2020 by the authors.
Authors
Dimitrov B.1
,
Rykov V.
2,
3
,
Milovanova T.
3
Journal
Publisher
MDPI AG
Number of issue
3
Language
English
Status
Published
Link
Number
459
Volume
8
Year
2020
Organizations
- 1 Department of Mathematics, Kettering University, Flint, MI 48504, United States
- 2 Department of Applied Mathematics and Computer Modeling, Gubkin Russian State Oil and Gas University (Gubkin University), Moscow, 119991, Russian Federation
- 3 Department of Applied Probability and Informatics, Peoples' Friendship University of Russia (RUDN University), 6 Miklukho-Maklaya St, Moscow, 117198, Russian Federation
Keywords
LST and PGF probability interpretation; Marshall-Olkin reliability model; Reliability analysis; Stationary probabilities; System with component-dependent failures
Date of creation
02.11.2020
Date of change
02.11.2020
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