Radiant Panel Columns Magnetostrictive Transducers of Forced Vibration


Article Preview

the columns of magnetostrictive transducer for the object, the establishment of a Radiant Panel in magnetostrictive rods through the spring of motion model, gives a method for solving first-order analysis and solutions, discusses the spring rate on radiation effect of amplitude. On reasonable determination of Radiant Panel structure, the size of the transducer, and optimization methods.



Advanced Materials Research (Volumes 588-589)

Edited by:

Lawrence Lim




J. P. Sun and J. X. Wang, "Radiant Panel Columns Magnetostrictive Transducers of Forced Vibration", Advanced Materials Research, Vols. 588-589, pp. 359-363, 2012

Online since:

November 2012




[1] Caozhiyuan. Theory of vibration of plate and shell. ( Railway Publishing House, beijing1989).

[2] Hefubao, shenyapeng. Theory of plates and shells. (Xian Jiaotong University press 1993).

[3] Xuxu, hefubao: Thick circular plate axisymmetric vibration of elastic mechanics solution. Chinese Quarterly of Mechanics, 2000, 21(1): 59-64.

[4] Liuruchang, pengjianshe: Energy method for solving the harmonic force vibration. Journal of Guizhou University , 2004, 21(3): 261-263.

[5] Xulanzhen. Swap method for vibration and wave equation. journal of university of science & technology. 199818(2): 173-175.

[6] Cuiyongjun, miaoyan. Response of circular plate with elastic boundary to harmonic excitation. Modular machine tool & automatic manufacturing technique, 2002, (4): 12-14.

[7] Y. Xing. Vibration of circular Mindlin plates with concentric elastic ring supports[J]. International Journal of Mechanical Sciences, 2003, 45: 497-517.

DOI: https://doi.org/10.1016/s0020-7403(03)00059-6

[8] K. GULER AND Z. CELEP. Static and dynamic responses of a circular plate on a tensionless elastic foundation[J]. Journal of Sound and Vibration, 1995, 183 (2), 185-195.

DOI: https://doi.org/10.1006/jsvi.1995.0248

[9] Mehmet Utku, etc. Circular plates on elastic foundations modelled with annular plates[J]. Computers and Structures, 2000, 78, 365-374.

DOI: https://doi.org/10.1016/s0045-7949(00)00063-8

[10] S. M. LIN. The closed-form solution for the forced vibration of non-dependent boundary conditions[J]. Journal of Sound and vibration, 2000, 232(3), 493-509.

DOI: https://doi.org/10.1006/jsvi.1999.2750

[11] Exact solution of the asymmetric Mindlin's plate equations applied to a disk[J]. Journal of Sound and Vibration, 2003, 261, 153–168.