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On suppression of chaotic motions of a portal frame structure under non-ideal loading using a magneto-rheological damper

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Warianty tytułu
Języki publikacji
EN
Abstrakty
EN
We consider chaotic motions of a portal frame structure under non-ideal loading. To suppress this chaotic behavior, a controlling scheme is implemented. The control strategy involves application of two control signals and nonlinear feedforward control to maintain a desired periodic orbit, and state feedback control to bring the system trajectory into the desired periodic orbit. Additionally, the control strategy includes an active magneto-rheological damper to actuate the system. The control force of the damper is a function of the voltage applied in the coil of the damper that is based on the force given by the controller.
Słowa kluczowe
Rocznik
Strony
653--664
Opis fizyczny
Bibliogr. 21 poz., rys.
Twórcy
autor
  • Federal University of Technology-Paraná – UTFPR, Ponta Grossa, PR, Brazil
  • Federal University of Technology-Paraná – UTFPR, Ponta Grossa, PR, Brazil
  • University Paulista State – UNESP, Rio Claro, SP, Brazil
  • Federal University of ABC – UFABC, Santo Andre, SP, Brasil
Bibliografia
  • 1. Balthazar J.M., Tusset A.M., Bueno A.M., 2014, TM-AFM nonlinear motion control with robustness analysis to parametric errors in the control signal determination, Journal of Theoretical and Applied Mechanics, 52, 1, 93-106
  • 2. Bolla M., Balthazar J.M., Felix J.L.P., Mook D.T., 2007, On an approximate analytical solution to a nonlinear vibrating problem, excited by a non-ideal motor, Nonlinear Dynamics, 50, 841-847
  • 3. Castão K.A.L., Goes L.C.S., Balthazar J.M. , 2010, A note on the attenuation of the sommerfeld effect of a non-ideal system taking into account a MR damper and the complete model of a DC motor, Journal of Vibration and Control, 17, 7, 1112-1118
  • 4. Cetin S., Zergeroglu E., Sivrioglu S., Yuksek I., 2011, A new semiactive nonlinear adaptive controller for structures using MR damper: Design and experimental validation, Nonlinear Dynamics, 66, 4, 731-743
  • 5. Djanan A.A.N., Nbendjo B.R.N., Woafo P., 2013, Electromechanical control of vibration on a plate submitted to a non-ideal excitation, Mechanics Research Communications, 54, 72-82
  • 6. Dutta S., Chakraborty G., 2014, Performance analysis of nonlinear vibration isolator with magneto-rheological damper, Journal of Sound and Vibration, 333, 5097-5114
  • 7. Dyke S.J., Spencer B.F. Jr., Sain M.K., Carlson J.D., 1996, Modeling and control of magnetorheological dampers for seismic response reduction, Smart Materials and Structures, 5, 565-575
  • 8. Jimenez R., Alvarez L., 2002, Real time identification of structures with magnetorheological dampers, Proceedings of the 41st IEEE Conference on Decision and Control, 1017-1022
  • 9. Jimenez R., Alvarez L., 2005, LuGre friction model for a magnetorheological damper, Structural Control and Health Monitoring, 12, 91-116
  • 10. Kasemi B., Muthalif A.G.A., Rashid M.M., Fathima S., 2012, Fuzzy-PID Controller for semi-active vibration control using magnetorheological fluid damper, Procedia Engineering, 41, 1221-1227
  • 11. Piccirillo V., Tusset A.M., Balthazar J.M., 2014, Dynamical jump attenuation in a non- -ideal system through magneto rheological damper, Journal of Theoretical and Applied Mechanics, 52, 2, 595-604
  • 12. Rafikov M., Balthazar J.M., Tusset A.M., 2008, An optimal linear control design for nonlinear systems, Journal of the Brazilian Society of Mechanical Sciences and Engineering, 30, 279-284
  • 13. Rafikov M., Balthazar J.M., 2004, On an optimal control design for R¨ossler system, Physics Letters A, 333, 241-245
  • 14. Sakai C., Ohmori H., Sano A., 2003, Modeling of MR damper with hysteresis for adaptive vibration control, Proceedings of the 42nd IEEE Conference on Decision and Control, 3840-3845
  • 15. Samantaray A.K., Dasgupta S.S., Bhattacharyya R., 2010, Sommerfeld effect in rotationally symmetric planar dynamical systems, International Journal of Engineering Science, 48, 21-36
  • 16. Spencer Jr. B.F., Dyke S.J., Sain M.K., Carlson J.D., 1997, Phenomenological model of a magnetorheological damper, ASCE Journal of Engineering Mechanics, 3, 230-238
  • 17. Terasawa T., Sakai C., Ohmori H., Sano A., 2004, Adaptive identification of MR damper for vibration control, Proceedings of the 43rd IEEE Conference on Decision and Control, 14-17
  • 18. Tusset A.M., Balthazar J.M., 2013, On the chaotic suppression of both ideal and non-ideal Duffing based vibrating systems, using a magnetorheological damper, Differential Equations and Dynamical Systems, 21, 105-121
  • 19. Tusset A.M., Balthazar J.M., Felix J.L.P., 2013, On elimination of chaotic behavior in a non-ideal portal frame structural system, using both passive and active controls, Journal of Vibration and Control, 19, 803-813
  • 20. Tusset A.M., Balthazar J.M., Chavarette F.R., Felix J.L.P., 2012, On energy transfer phenomena, in a nonlinear ideal and nonideal essential vibrating systems, coupled to a (MR) magneto-rheological damper, Nonlinear Dynamics, 69, 1859-1880
  • 21. Tusset A.M., Rafikov M., Balthazar J.M., 2009, Intelligent controller design for magnetorheological damper based on quarter-car model, Journal of Vibration and Control, 15, 1907-1920
Typ dokumentu
Bibliografia
Identyfikator YADDA
bwmeta1.element.baztech-7a2c2983-ee07-4357-a205-98e1221528b4
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