New approaches to the estimation of dynamic properties of vibrational structures: frequency functions and connectivity of movements

DOI: 10.34759/trd-2021-120-08

Аuthors

Eliseev A. V.^1*, Kuznetsov N. K.^1**, Eliseev S. V.^2***

1. Irkutsk National Research Technical University, 83, Lermontov str., Irkutsk, 664074, Russia
2. Irkutsk State Transport University (IrGUPS), 15, Chernyshevsky str., Irkutsk, 664074, Russia

*e-mail: eavsh@ya.ru
**e-mail: knik@istu.edu
***e-mail: eliseev_s@inbox.ru

Abstract

The scientific and methodological foundations for solving dynamics problems of technological and transport objects, operating under high vibration loads, are being developed. The purpose of the study consists in developing methods for dynamic properties analyzing of technical means (machines, equipment, devices), which design schemes are being reflected in the form of mechanical vibratory systems with several degrees of freedom. The studies are based on application of analytical apparatus of system analysis and its applications to the problems of machines dynamics, equipment and instruments protection fr om the vibrational impacts, which constitutes the basis for operational safety and reliability provision of hardware components. The issues of extra bonds, being realized by the simplest mechanisms, impact on the dynamic properties of the systems were regarded. Specifics of mechanical vibrational systems were studied based on introducing the notions on frequency systems and their forms. Specifics of dynamic vibrations damping modes under single and joint (by two coordinates) effect of the two periodical disturbances were studied. The numerical modeling data is presented. Characteristic modes of natural vibrations can be distinguished in the dynamics of mechanical vibrational systems, being regarded as design schemes of technical objects of both transport and technological purpose. Vibrations occurring herewith reflect the system reaction on the harmonic type external disturbances, representing movement of elements with certain amplitudes vibrations ratios along various coordinates. These ratios are being formed based on the parameters values of the system elements at the introduction notion on frequency functions, associated with the detailed regard of potential and kinetic energies ratio, as well as natural vibrations frequencies function of the energy expressions structure. Particularly, extremal property of the potential and kinetic energies ratio of the system is associated with the natural vibrations frequencies values. Within the framework of the approach being developed, the effect of frequencies closing-in of the dynamic vibrations damping to the one of the natural frequencies was considered. The possibility of the lim it mode of the mechanical system realization with two degrees of freedom in the form reduction to the system with one degree of freedom was demonstrated.

Keywords:

technical object, design scheme, mathematical model, transfer function, dynamic vibration damping, motion connectivity, frequency function

References

1. Clarence W. de Silva. Vibration: Fundamentals and Practice, Boca Raton, London, New York, Washington, D.C.: CRC Press, 2006, 1064 p.

2. Karnovsky I.A., Lebed E. Theory of Vibration Protection, Springer International Publishing, Switzerland, 2016, 708 p.

3. Eliseev S.V., Eliseev A.V. Theory of Oscillations. Structural Mathematical Modeling in Problems of Dynamics of Technical Objects. Series: Studies in Systems, Decision and Control, vol. 252, Springer International Publishing, Cham, 2020, 521 p.

4. Doronin S.V., Shokin Yu.I., Lepikhin A.M., Moskvichev V.V. Modelirovanie prochnosti i razrusheniya nesushchikh konstruktsii tekhnicheskikh system (Modeling of strength and fracture of load-bearing structures of technical systems), Novosibirsk, Nauka, 2005, 249 p.

5. Eliseev S.V. Prikladnoi sistemnyi analiz i strukturnoe matematicheskoe modelirovanie (dinamika transportnykh i tekhnologicheskikh mashin: svyaznostrsquo; dvizhenii, vibratsionnye vzaimodeistviya, rychazhnye svyazi): monografiya (Applied system analysis and structural mathematical modeling (dynamics of transport and technological machines: connectivity of movements, vibration interactions, lever connections)), Irkutsk, IrGUPS, 2018, 692 p.

6. Eliseev S.V., Eliseev A.V., Bolrsquo;shakov R.S., Khomenko A.P. Metodologiya sistemnogo analiza v zadachakh otsenki, formirovaniya i upravleniya dinamicheskim sostoyaniem tekhnologicheskikh i transportnykh mashin (Methodology of system analysis in the tasks of assessment, formation and management of the dynamic state of technological and transport machines), Novosibirsk, 2021, 679 p.

7. Banakh L., Kempner M. Vibrations of Mechanical Systems with Regular Structure, Berlin, Heidelberg, Springer, 2010, 262 p.

8. Harris S.M., Srede E. Shock and Vibration Handbook, New York, McGraw — Hill Book So, 2009, 1168 p.

9. Iwnicki Simon. Handbook of railway vehicle dynamics, CRC Press Taylor amp; Francis Group, 2006, 527 p.

10. Bolrsquo;shakov R.S. Osobennosti vibratsionnykh sostoyanii transportnykh i tekhnologicheskikh mashin. Dinamicheskie reaktsii i formy vzaimodeistviya elementov (Features of vibration states of transport and technological machines. Dynamic reactions and forms of interaction of elements), Novosibirsk, Nauka, 2020, 411 p.

11. Khokhlov A.A. Dinamika slozhnykh mekhanicheskikh system (Dynamics of complex mechanical systems), Moscow, MIIT, 2002, 172 p.

12. Galiev I.I., Nekhaev V.A., Nikolaev V.A. Metody i sredstva vibrozashchity zheleznodorozhnykh ekipazhei (Methods and means of vibration protection of railway crews), Moscow, Izd-vo Uchebno-metodicheskii tsentr po obrazovaniyu na zh.-d. transporte, 2010, 340 p.

13. Betkovskii Yu.Ya., Sidorenko A.S. Trudy MAI, 2007, no. 29. URL: http://trudymai.ru/eng/published.php?ID=33978

14. Popov I.P. Trudy MAI, 2020, no. 115. URL: http://trudymai.ru/eng/published.php?ID=119888. DOI: 10.34759/trd-2020-115-01

15. Popov I.P. Trudy MAI, 2021, no. 116. URL: http://trudymai.ru/eng/published.php?ID=121007. DOI: 10.34759/trd-2021-116-01.

16. Eliseev A.V., Kuznetsov N.K., Eliseev S.V., Vuong Q.T. Possibilities for regulation of distribution of oscillation amplitudes points of working bodies of technological machines, IOP Conference Series Materials Science and Engineering, 2020. DOI:10.1088/1757-899X/843/1/012017

17. Eliseev A.V., Kuznetsov N.K., Eliseev S.V. Trudy MAI, 2021, no. 118. URL: http://trudymai.ru/eng/published.php?ID=158213. DOI: 10.34759/trd-2021-118-04

18. Eliseev S.V., Lukyanov A.V., Reznik Yu.N., Khomenko A.P. Dynamics of mechanical systems with additional ties, Publishing Irkutsk State University, 2006, 316 p.

19. Lurrsquo;e A.I. Operatsionnoe ischislenie i primenenie v tekhnicheskikh prilozheniyakh (Operational calculus and its application in technical applications), Moscow, Nauka, 1959, 368 p.

20. Druzhinskii I.A. Mekhanicheskie tsepi (Mechanical chains), Leningrad, Mashinostroenie, 1977, 240 p.

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