Determination of Efficiency of Weapon Systems Maintenance as Condition for DM Distribution

Authors

  • V. Mirnenko National Defense University of Ukraine named after Ivan Cherniakhovskyi, Kyiv, Ukraine
  • P. Yablonsky National Defense University of Ukraine named after Ivan Cherniakhovskyi, Kyiv, Ukraine
  • V. Tyurin National Defense University of Ukraine named after Ivan Cherniakhovskyi, Kyiv, Ukraine
  • A. Salii National Defense University of Ukraine named after Ivan Cherniakhovskyi, Kyiv, Ukraine
  • O. Avramenko National Defense University of Ukraine named after Ivan Cherniakhovskyi, Kyiv, Ukraine
  • M. Kasianenko National Defense University of Ukraine named after Ivan Cherniakhovskyi, Kyiv, Ukraine

DOI:

https://doi.org/10.3849/aimt.01463

Keywords:

condition-based maintenance, diffusion-monotonic distribution law, maintenance and repair system, technical and economic model

Abstract

The article discusses the mathematical model of technical condition-based maintenance
of weapon systems. The model his developed based on a semi-Markov stochastic
process. The diffusion-monotonic (DM) distribution law, which is specific for airfield
technical condition-based maintenance of aircraft, is has been used as a failure model,
and type I errors are considered. For standard operating conditions, graphs of the
dependence of the coefficient of technical use and specific costs per hour of operation in
good condition from the basic parameters are shown. The optimal maintenances interval
ensuring maximum maintenance coefficient value has been proved. The principal results
have been achieved by using multiple calculation method.

Author Biography

  • O. Avramenko, National Defense University of Ukraine named after Ivan Cherniakhovskyi, Kyiv, Ukraine

    PhD, Associate Professor of the Department of Logistics of the Air Force of the Institute of Aviation and Air Defense of the National Defense University of Ukraine named after Ivan Cherniakhovskyi

References

ABLONSKY, P.M., S.A. PUSTOVOY and P.V. OPEN’KO. Economic Mathematical Model of Maintenance of Samples of Weapons and Military Equipment According to the State or Diffusion-Non-Monotonic Distribution of Failures (in Russian). Economy and Entrepreneurship, 2013, 8, рр. 436-443. ISSN 1999-2300.

MIRNENKO, V.I., P.M. YABLONSKY, S.A. PUSTOVOY and Y.P. SELISHCHEV. The Feasibility Study of Condition-Based Maintenance of Aerial Vehicle with Diffusive-Monotonous Distribution of Their Failures (in Russian). Journal of Scientific Papers Social Development and Security, 1(1), pp. 58-68. DOI 10.5281/zenodo.1056827.

BORUCKA, A., A. NIEWCZAS and K. HASILOVA. Forecasting the Readiness of Special Vehicles Using the Semi-Markov Model. Maintenance and Reliability,2019, 21(4), рp. 662-669. DOI 10.17531/ein.2019.4.16.

DANIEWSKI, K., E. KOSICKA and D. MAZURKIEWICZ. Analysis of the Correctness of Determination of the Effectiveness of Maintenance Service Actions. Management and Production Engineering Review, 2018, 9(2), рp. 20-25. DOI 10.24425/119522.

TANG, D., W. SHENG and J. YU. Dynamic Condition-Based Maintenance Policy for Degrading Systems Described by a Random-Coefficient Autoregressive Model: A Comparative Study. Maintenance and Reliability, 2018, 20(4), рp. 590-601. DOI 10.17531/ein.2018.4.10.

BORUCKA, A. Empirical Analysis of Transportation Systems Availability Using the Semi-Markov Process. In: Proceedings of the 29th European Safety and Reliability Conference. Singapore: Research Publishing, 2019, pр. 834-839. DOI 10.3850/978-981-11-2724-3_0136-cd.

ŚWIDERSKI, A., A. BORUCKA, M. GRZELAK and L. GIL. Evaluation of the Machinery Readiness Using Semi-Markov Processes. Applied Sciences, 2020, 10(4), 1541. DOI 10.3390/app10041541.

OPEN’KO, P.V., P.A. DRANNYK, V.V. KOBZEV, M.B. BROVKO and G.S. ZALEVSKY. Substantiation of Reliability Requirements for Mobility Means of Surface-to-Air Missile Systems. Advances in Military Technology, 2017, 12(1), pp. 91-99. DOI 10.3849/aimt.01122.

BORUCKA, A. Method of Testing the Readiness of Means of Transport with the Use of Semi-Markov Processes. Transport, 2021, 36(1), pp. 75-83. DOI 10.

/transport.2021.14370.

ASMUSSEN, S., L. LIPSKY and S. THOMPSON. Markov Renewal Methods in Restart Problems in Complex Systems. In: M. Podolskij, R. Stelzer, S. Thorbjornsen and A. Veraart, eds. The Fascination of Probability, Statistics and their Applications. Cham: Springer, 2016, pp. 501-527. DOI 10.1007/978-3-319-25826-3_23. Advances in Military Technology, 2022, vol. 17, no. 2, pp. 325-339 339

VOLKOV, L.I. Aircraft Operations Management (in Russian). Moscow: Vysshaya Shkola, 1981.

Instructions on the Procedure for Assessing the Electric and Gas Equipment of the Air Forces of the Armed Forces of Ukraine, which Is Recorded on the Off Balance Sheet Account 010. In Value Terms (in Ukrainian). Vinnytsia: Armed Forces of Ukraine, 2009.

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Published

21-10-2022

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Research Paper

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How to Cite

Mirnenko, V., Yablonsky, P. ., Tyurin, V. ., Salii, A. ., Avramenko, O., & Kasianenko, M. . (2022). Determination of Efficiency of Weapon Systems Maintenance as Condition for DM Distribution. Advances in Military Technology, 17(2), 325-339. https://doi.org/10.3849/aimt.01463

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