http://orcid.org/0000-0003-1507-6617
References
- R.L. Forward, Electronic damping of vibrations in optical structures, Appl. Opt. 18 (1979), pp. 690–697. doi:10.1364/AO.18.000690
- N.W. Hagood and A. von Vlotow, Damping of structural vibrations with piezoelectric materials and passive electrical networks, J. Sound Vib. 146 (2) (1991), pp. 243–268. doi:10.1016/0022-460X(91)90762-9
- C.H. Park and D.J. Inman, Enhanced piezoelectric shunt design, Shock Vib. 10 (2) (2003), pp. 127–133. doi:10.1155/2003/863252
- A.J. Fleming and S.O.R. Moheimani, Control orientated synthesis of high-performance piezoelectric shunt impedances for structural vibration control, IEEE Trans. Control Syst. Technol. 13 (1) (2005), pp. 97–113. doi:10.1109/TCST.2004.838547
- D. Wu, Z. Yang, and H. Sun, Vibration control efficiency of piezoelectric shunt damping system, Front. Mech. Eng. 4 (4) (2009), pp. 441–446. doi:10.1007/s11465-009-0055-4
- O. Thomas, J. Durcane, and J.-F. Deü, Performance of piezoelectric shunts for vibration reduction, Smart Mater. Struct. 21 (1) (2012). Article ID 0150082012. doi:10.1088/0964-1726/21/1/015008
- M. Berardengo, A. Cigada, S. Manzoni, and N. Vanali, Vibration control by means of piezoelectric actuators shunted with LR impedances: Performance and robustness analysis, Shock Vib. 2015 (2015), pp. 30. Article ID 704265. doi:10.1155/2015/704265
- J. Hogsberg and A. Le Cöent, Explicit solution format for complex-valued natural frequency of beam with R-shunted piezoelectric laminate transducer, Proc. IMechE Part. C: J. Mech. Eng. Sci. 228 (1) (2014), pp. 31–44. doi:10.1177/0954406213480615
- A. Preumont, Vibration Control of Active Structures, 3rd ed., Springer, Heidelberg, 2011.
- A.J. Fleming and S.O.R. Moheimani, Piezoelectric Transducers for Vibration Control and Damping, Springer, London, 2006.
- T. Deplero, A.E. Bergamini, and P. Ermanni, Identification of electromechanical parameters in piezoelectric shunt damping and loss factor prediction, J. Intell. Mater. Syst. Struct. 11 (2012), pp. 287–298.
- M. Porfiri, C. Maurini, and J. Pouget, Identification of electromechanical modal parameters of linear piezoelectric structures, Smart Mater. Struct. 16 (2007), pp. 323–331. doi:10.1088/0964-1726/16/2/010
- P. Soltani, G. Kerschen, G. Tondreau, and A. Deraemaeker, Piezoelectric vibration damping using resonant shunt circuits: An exact solution, Smart Mater. Struct. 23 (2014). Article ID 125014. doi:10.1088/0964-1726/23/12/125014
- O. Heuss, R. Salloum, D. Mayer, and T. Melz, Tuning of a vibration absorber with shunted piezoelectric transducers, Arch. Appl. Mech. 86 (10) (2016), pp. 1715–1732. doi:10.1007/s00419-014-0972-5
- O. Thomas, J.-F. Deü, and J. Durcane, Vibrations of an elastic structure with shunted piezoelectric patches: Efficient finite element formulation and electromechanical coupling coefficients, Int. J. Numer. Methods Eng. 80 (2009), pp. 235–261. doi:10.1002/nme.2632
- J. Durcane, O. Thomas, and J.-F. Deü, Placement and dimension optimization of shunted piezoelectric patches for vibration reduction, J. Sound Vib. 331 (2012), pp. 3286–3303. doi:10.1016/j.jsv.2012.03.002
- M. Berardengo, S. Manzoni, and M. Vanali, The behaviour of mistuned piezoelectric shunt systems and its estimation, Shock Vib. 2016 (2016), pp. 1–18. Article ID 9739217. doi:10.1155/2016/9739217
- J. Hogsberg and S. Krenk, Balanced calibration of resonant piezoelectric RL shunts with quasi-static background flexibility correction, J. Sound Vib. 341 (2015), pp. 16–30. doi:10.1016/j.jsv.2014.12.006
- C.H. Park and D.J. Inman, Uniform model for series R-L and parallel R-L shunt circuits and power consumption, Proc. SPIE Conf. Smart Struct. Integr. Syst.. 3668 (1999), pp. 797–804.
- M. Berardengo, S. Manzoni, and A.M. Conti, Multi-mode passive piezoelectric shunt damping by means of matrix inequalities, J. Sound Vib. 405 (2017), pp. 287–305. doi:10.1016/j.jsv.2017.06.002
- M. Berardengo, O. Thomas, C. Giraud-Audine, and S. Manzoni, Improved resistive shunt by means of negative capacitance: New circuit, performances and multi-mode control, Smart Mater. Struct. 25 (2016). Article ID 075033. doi:10.1088/0964-1726/25/7/075033
- E.P. Kligman and V.P. Matveenko, Natural vibration problem of viscoelastic solids as applied to optimization of dissipative properties of constructions, Int. J. Vibration Control 3 (1) (1997), pp. 1715–1732.
- V.P. Matveenko, E.P. Kligman, M.A. Yurlov, and N.A. Yurlova, Simulation and optimization of dynamic characteristics of piezoelectric smart structures, Phys. Mesomech. 15 (3–4) (2012), pp. 190–199. doi:10.1134/S1029959912020063
- K. Washizu, Variational Methods in Elasticity and Plasticity, Pergamon Press, London, 1982.
- V.Z. Parton and B.A. Kudryavtsev, Electromagnetoelasticity of Piezoelectric and Electroconductive Bodies, Nauka, Moscow, 1988.
- V.G. Karnaukhov and I.F. Kirichok, Electrothermal Viscoelasticity, Nauk, Dumka, Kiev, 1988.
- V.P. Matveenko, D.A. Oshmarin, N.V. Sevodina, and N.A. Yurlova, Natural vibration problem for electroviscoelstic body with external electric circuits and finite-element relations for its numerical implementation, Comput. Continuum Mech. 9 (4) (2016), pp. 476–485. doi:10.7242/1999-6691/2016.9.4.40
- V.P. Matveenko, M.A. Yurlov, and N.A. Yurlova, Optimization of the damping properties electro-viscoelastic objects with external electric circuits, in Mechanics of Advanced Materials, V.V. Silberschmidt and V.P. Matveenko, eds., Springer, Vienna, 2015, pp. 79–100.
- K.A. Charles and M.N.O. Sadiku, Fundamentals of Electric Circuits, 4th ed., The McGraw-Hill Companies Inc., New York, 2009.
- W.H. Hayt Jr, J.E. Kemmerly, and S.M. Durbin, Engineering Circuit Analysis, 8th ed., The McGraw-Hill Companies Inc., New York, 2012.