https://orcid.org/0000-0002-2975-6739
References
- Kerwin EMJ. Damping of flexural waves by a constrained viscoelastic layer. J Acoust Soc Am. 1959;31:952–962.
- Al-Ajmi MA, Bourisli RI. Optimum design of segmented passive-constrained layer damping treatment through genetic algorithms. Mech Adv Mater Struct. 2008;15:250–257.
- Rao DK. Frequency and loss factors of sandwich beams under various boundary conditions. J Mech Eng Sci. 1978;20:271–282.
- Calim FF, Cuma YC. Forced vibration analysis of viscoelastic helical rods with varying cross-section and functionally graded material. Mech Based Des Struct Mach. 2021;1–12. DOI:10.1080/15397734.2021.1931307
- Tian S, Xu Z, Wu Q, et al. Dimensionless analysis of segmented constrained layer damping treatments with modal strain energy method. Shock Vib. 2016;2016:1–16.
- Daya EM, Potier-Ferry M. Numerical method for nonlinear eigenvalue problems application to vibrations of viscoelastic structures. Comput Struct. 2001;79:533–541.
- Galucio AC, Deü JF, Ohayon R. Finite element formulation of viscoelastic sandwich beams using fractional derivative operators. Comput Mech. 2004;33:282–291.
- Thompson BS, Sung CK. A variational formulation for the dynamic viscoelastic finite element analysis of robotic manipulators constructed from composite materials. J Mech Transm Autom Des. 1984;106:183–190.
- Yim JH, Cho SY, Seo YJ, et al. A study on material damping of 0 ° laminated composite sandwich cantilever beams with a viscoelastic layer. Compos Struct. 2003;60:367–374.
- Lin CY, Chen LW. Dynamic stability of rotating composite beams with a viscoelastic core. Compos Struct. 2002;58:185–194.
- Kumar KK, Krishna Y, Bangarubabu P. Damping in beams using viscoelastic layers. Inst Mech Eng. 2015;229:117–125.
- Pau GSH, Zheng H, Liu GR. A comparative study on optimization of constrained layer damping for vibration control of beams. Thin-Walled Struct. 2006;44:886–896.
- Zheng HÃ, Pau GSH, Wang YY. A comparative study on optimization of constrained layer damping treatment for structural vibration control. Thin-Walled Struct. 2006;44:886–896.
- Zhu B, Dong Y, Li Y. Nonlinear dynamics of a viscoelastic sandwich beam with parametric excitations and internal resonance. Nonlinear Dyn. 2018;94:2575–2612.
- Fung EH, Zou JQ, Lee HWJ. Lagrangian formulation of rotating beam with active constrained layer damping in. J Mech Des. 2004;126:359–364.
- Tzout HS, Wan GC. Distributed structural dynamics control of flexible manipulators-i. structural dynamics and distributed viscoelastic actuator. Compos Struct. 1990;35:669–677.
- Zijie F, Bingheng L, Ku CH. Dynamic analysis of flexible manipulator arms with distributed viscoelastic damping. J Dyn Syst Meas Control. 1997;119:831–833.
- Arvin H, Sadighi M, Ohadi AR. A numerical study of free and forced vibration of composite sandwich beam with viscoelastic core. Compos Struct. 2010;92:996–1008.
- Wei K, Meng G, Lu H, et al. Dynamic analysis of rotating electrorheological composite beams. Int J Mod Phys B. 2005;19:1236–1242.
- Boumediene F, Bekhoucha F, Daya EM. Modal analysis of rotating viscoelastic sandwich beams. Mech Adv Mater Struct. 2021;28:405–417.
- Cortés F, Sarriá I. Dynamic analysis of three-layer sandwich beams with thick viscoelastic damping core for finite element applications. Shock Vib. 2015;2015:1–10.
- Zou JQ, Fung EHK, Lee HW. IMECE2003-4 1246. Proceedings of IMECE’03 2003 ASME International Mechanical Engineering Congress November 15-21, 2003; Washington (DC); 2003. p. 1–7.
- Cai GP, Lim CW. Dynamics studies of a flexible hub-beam system with significant damping effect. J Sound Vib. 2008;318:1–17.
- Cai G, Hong J, Yang SX. Model study and active control of a rotating flexible cantilever beam. Int J Mech Sci. 2004;46:871–889.
- Mead DJ, Markus S. The forced vibration of a three layer, damped sandwich beam with arbitrary boundary conditions. J Sound Vib. 1969;10:163–175.
- Cai GP, Hong JZ, Yang SX. Dynamic analysis of a flexible hub-beam system with tip mass. Mech Res Commun. 2005;32:173–190.