Vibration characteristics of viscoelastic composite damping plates

被引：0

作者：

Zhai Y. ^{[1
,2
]}

Liang S. ^{[2
]}

Ma J. ^{[1
]}

Ren Y. ^{[1
]}

Wang S. ^{[2
]}

机构：

[1] School of Mechanical Engineering, Weifang University of Science and Technology, Shouguang

[2] School of Mechanical & Automotive Engineering, Qingdao University of Technology, Qingdao

来源：

Zhendong yu Chongji/Journal of Vibration and Shock | 2021年 / 40卷 / 08期

关键词：

Composite; Damping plate; Vibration characteristics; Viscoelasticity;

D O I：

10.13465/j.cnki.jvs.2021.08.018

中图分类号：

学科分类号：

摘要：

To further explore the vibration characteristics of viscoelastic composite damping plates, the complex vibration differential equation of viscoelastic composite damping plates was derived based on the mechanics of composite materials, the first order shear deformation theory, a piecewise displacement model and the Hamilton's principle. The theoretical solution satisfying the displacement boundary condition was obtained by the Navier method, and the theoretical solution was verified by finite element simulation. Finally, based on the verified theoretical model, the change rule of vibration characteristics of viscoelastic composite damping plate with the structural parameters were explored theoretically. © 2021, Editorial Office of Journal of Vibration and Shock. All right reserved.

引用

页码：137 / 142and156

共 14 条

[1] DANIEL I M, ISHAI O., Engineering mechanics of composite materials, Materials & Design, 17, 2, pp. 114-121, (1996)
[2] ZHANG Y X, YANG C H., Recent developments in finite element analysis for laminated composite plates, Composite Structure, 88, pp. 147-157, (2008)
[3] LIANG S, XIU Y, WANG H., A research on sound insulation characteristics and processing of the embedded and co-cured composite damping structures, Journal of Composite Material, 47, pp. 1169-1177, (2013)
[4] LIANG S, LIANG K, LUO L, Et al., Study on low-velocity impact of embedded and co-cured composite damping panels with numerical simulation method, Composite Structure, 107, pp. 1-10, (2014)
[5] BISWAL M, SAHU S K, ASHA A V., Experimental and numerical studies on free vibration of laminated composite shallow shells in hygrothermal environment, Composite Structures, 127, pp. 165-174, (2015)
[6] VLACHOUTSIS S., Shear correction factors for plates and shells, Internation Journal for Numerical Methods in Engineering, 33, 7, pp. 1537-1552, (1992)
[7] GHUGAL Y M, SHIMPI R P., A review of refined shear deformation theories of isotropic and anisotropic laminated plates, Journal of Reinforced Plastics and Composites, 21, 9, pp. 775-813, (2002)
[8] TU T M, THACH L N, QUOC T H., Finite element modeling for bending and vibration of laminated and sandwich composite plates based on higher-order theory, Computer Material Science, 49, pp. 390-394, (2010)
[9] TIMOSHENKO S P., On the transverse vibrations of bars of uniform cross section, Philosophical Magazine, 43, pp. 125-131, (1922)
[10] MINDLIN R D., Influence of rotary inertia and shear on flexural motions of isotropic, elastic plates, Journal of Applied Mechanics, 18, 1, pp. 31-38, (1951)

← 1 2 →