Open Access
Subscription Access
Multi Objective Optimization of Parameters of Torsional Vibration Dampers Considering Damping Effect and Light Weight Design
Subscribe/Renew Journal
To reduce the torsional vibration of vehicle power transmission system (VPTS), a torsional vibration model with multiple degrees of freedom (MDOF) of VPTS was established. The scheme of equipping torsional vibration dampers (TVDs) on the drive shaft was employed by the calculation of the forced vibration and the free vibration of the VPTS. The energy method was used to optimize the parameters of single-stage, two-stage parallel, and two-stage series TVDs based on the principle that balances the damping effect and lightweight design. On the basis of this, the parameters of the models incorporating TVD and elastic couplings (ECs) were optimized. Results showed that the proposed method can ensure the damping effects of TVD and realize the lightweight.
Keywords
Torsional Vibration Dampers, Two-Stage Parallel TVD, Two-stage Series TVD, Elastic Coupling, Lightweight.
User
Subscription
Login to verify subscription
Font Size
Information
- B. Brown and T. Singh. 2011. Minimax design of vibration absorbers for linear damped systems, J. Sound & Vibration, 330(11), 2437-2448. https://doi.org/10.1016/j.jsv.2010.12.002.
- M.B. Ozer and T.J. Royston. 2005. Application of Sherman-Morrison matrix inversion formula to damped vibration absorbers attached to multi-degree of freedom systems, J. Sound & Vibration, 283(3), 1235-1249. https://doi.org/10.1016/j.jsv.2004.07.019.
- R. ViguiƩ and G. Kerschen. 2009. Nonlinear vibration absorber coupled to a nonlinear primary system: A tuning methodology, J. Sound & Vibration, 326(3-5), 780-793. https://doi.org/10.1016/j.jsv.2009.05.023.
- K. Nagaya and L. Li. 1997. Control of sound noise radiated from a plate using dynamic absorbers under the optimization by neural network, J. Sound & Vibration, 208(2), 289-298. https://doi.org/10.1006/jsvi.1997.1201.
- O. Lavan and Y. Daniel. 2013. Full resources utilization seismic design of irregular structures using multiple tuned mass dampers, Structural & Multidisciplinary Optimization, 48(3), 517-532. https://doi.org/10.1007/s00158-013-0913-x.
- K. Liu and J. Liu. 2005. The damped dynamic vibration absorbers: revisited and new result, J. Sound & Vibration, 284(3), 1181-1189. https://doi.org/10.1016/j.jsv.2004.08.002.
- S. Wenbin and P. Xiaoyong. 2008. Multi-mode and rubber-damped torsional vibration absorbers for engine crankshaft systems, Int. J. Vehicle Design, 47(1/2/3/4), 176-188.
- S.J. Zhu, Y.F. Zheng and Y.M. Fu. 2004. Analysis of non-linear dynamics of a two-degree-of-freedom vibration system with non-linear damping and non-linear spring, J. Sound & Vibration, 271(1-2), 15-24. https://doi.org/10.1016/S0022-460X(03)00249-9.
- J. Maes and H. Sol. 2003. A double tuned rail damper Increased damping at the two first pinned-pinned frequencies, J. Sound & Vibration, 267(3), 721-737. https://doi.org/10.1016/S0022-460X(03)00736-3.
- A.D.G. Silva, A.A. Cavalini Jr and V. Steffen Jr. 2016. Fuzzy robust design of dynamic vibration absorbers, Shock & Vibration, 2081518, 1-10. https://doi.org/10.1155/2016/2081518.
- J.P. Den Hartog. 1956. Mechanical Vibrations. McGraw-Hill.
- G.C. Marano, G. Quaranta and R. Greco. 2008. Multiobjective optimization by genetic algorithm of structural systems subject to random vibrations, Structural and Multidisciplinary Optimization, 39(4), 385-399. https://doi.org/10.1007/s00158-008-0330-8.
- S.Y. Ok, J. Song and K.S. Park. 2009. Development of optimal design formula for bi-tuned mass dampers using multi-objective optimization, J. Sound & Vibr., 322(1-2), 60-77. https://doi.org/10.1016/j.jsv.2008.11.023.
- R. Hoseini and H. Salehipoor. 2013. Optimum design process of vibration absorber via imperialist competitive algorithm, Int. J. Structural Stability & Dynamics, 12(3), 1-15.
- R.A. Borges, F.S. Lobato and V. Steffen. 2012. Multiobjective optimization line-up algorithm applied to the design of a nonlinear vibration absorber, Proc. 10th World Congress on Computational, 1(1), 1529-1540.
- E.J. Nestorides. 2011. A Handbook on Torsional Vibration, Cambridge University Press.
- S.S. Rao. Mechanical Vibrations, 5th Ed., Prentice Hall.
- X. Tan, L. Hua and C. Lu. 2017. Study of the optimization of matching between torsional vibration damper and elastic coupling based on energy method, J. Vibro. Engg., 19(2), 769-782. https://doi.org/10.21595/jve.2016.17135.
- J. Mancuso. 1999. Coupling and Joints: Design, Selection & Application, 2nd Ed., Marcell Dekker, New York.
Abstract Views: 693
PDF Views: 221