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Abstract

In this paper, the vibration characteristics of axially moving plates with viscous damping are analyzed. A partial differential linear equation of motion with four simply supported edges is presented. The effects of two different viscous damping models are highlighted, while both of them have been introduced in previous studies. The investigation into the two different viscous damping models is interesting in itself. It is noteworthy that which model is closer to the fact, for which there are no systematic techniques of investigation to deal with this problem. In order to give a reference for possible verification in experiment, the difference of the two different viscous damping models in theory was proposed. The complex frequencies and its corresponding complex modes are studied by the complex mode approach. As other parameters are fixed, the effect of some parameters, such as viscous damping coefficients, axial speeds, aspect ratios, stiffness ratios, and support stiffness parameters, on the frequencies and critical speeds are examined. The complex modes illustrated in the 3-demensional figures are neither symmetric nor anti-symmetric to the midpoint of the plate owing to the plate motion. The differential quadrature scheme is used to verify the modes for the first time. The numerical calculations confirm the analytical results.

Keywords

Axially moving plate viscous damping nature frequency modes critical speed differential quadrature scheme

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References

Chen

Zhang

(2006) Adaptive vibration reduction of an axially moving string via a tensioner. International Journal of mechanical sciences 48: 1409–1415.

Chen

Huang

Shih

(2001) Response of an infinite Timoshenko beam on a viscoelastic foundation to a harmonic moving load. Journal of Sound and Vibration 241: 809–824.

Ghayesh

Amabili

(2013) Non-linear global dynamics of an axially moving plate. International Journal of Non-linear Mechanics 57: 16–30.

Ghayesh

Khadem

(2008) Rotary inertia and temperature effects on non-linear vibration, steady-state response and stability of an axially moving beam with time-dependent velocity. International Journal of mechanical sciences 50: 389–404.

Ghayesh

Amabili

Païdoussis

(2013) Nonlinear dynamics of axially moving plates. Journal of Sound and Vibration 332: 391–406.

Hedrih

(2007) Transversal vibrations of the axially moving sandwich belts. Archive of applied mechanics 77: 523–539.

Jakšic

Boltezar

(2005) Viscously damped transverse vibrations of an axially-moving string. Journal of Mechanical Engineering 51: 560–569.

Kim

Cho

Lee

Park

(2003) Modal spectral element formulation for axially moving plates subjected to in-plane axial tension. Computers and Structures 81: 2011–2020.

Lengoc

Mccallion

(1995a) Wide band saw blade under cutting conditions, Part I: vibration of a plate moving in its plane while subjected to tangential edge loading. Journal of Sound and Vibration 186: 125–142.

10.

Lengoc

Mccallion

(1995b) Wide bandsaw blade under cutting conditions, Part II: stability of a plate moving in its plane while subjected to parametric excitation. Journal of Sound and Vibration 186: 143–162.

11.

Lengoc

Mccallion

(1995c) Wide bandsaw blade under cutting conditions: Part III: stability of a plate moving in its plane while subjected to non-conservative cutting forces. Journal of Sound and Vibration 186: 163–179.

12.

Rahn

(2000) Adaptive vibration isolation for axially moving beams. ASME transactions on mechatronics 5: 419–428.

13.

Rahn

(2002) Adaptive vibration isolation for axially moving strings: theory and experiment. Automatica 38: 379–390.

14.

Lin

(1997) Stability and vibration characteristics of axially moving plates. International Journal of Solids and Structures 34: 3179–3190.

15.

Lin

(1998) Finite width effects on the critical speed of axially moving materials. Journal of Vibration and Acoustics 120: 633–634.

16.

Luo

ACJ

Hamidzadeh

(2004) Equilibrium and buckling stability for axially traveling plates. Communications in Nonlinear Science and Numerical Simulation 9: 343–360.

17.

Meterikine

Dieterman

(1997) Instability of vibrations of a mass moving uniformly along an axially compressed beam on a viscoelastic foundation. Journal of Sound and Vibration 201: 567–576.

18.

Mote

CDJr

(1968) Dynamic stability of an axially moving band. Journal of the Franklin Institute 285: 329–346.

19.

Nguyen

Hong

(2010) Asymptotic stabilization of a nonlinear axially moving string by adaptive boundary control. Journal of Sound and Vibration 329: 4588–4603.

20.

Öz

(2001) On the vibrations of an axially traveling beam on fixed supports with variable velocity. Journal of Sound and Vibration 239: 556–564.

21.

Öz

Pakdemirli

(1999) Vibrations of an axially moving beam with time dependent velocity. Journal of Sound and Vibration 227: 239–257.

22.

Panda

Kar

(2008) Nonlinear dynamics of a pipe conveying pulsating fluid with combination, principal parametric and internal resonances. Journal of Sound and Vibration 309: 375–406.

23.

Sze

Chen

Huang

(2005) The incremental harmonic balance method for nonlinear vibration of axially moving beams. Journal of Sound and Vibration 281: 611–626.

24.

Tang

(2011) Transverse vibrations of axially moving beams and in-plane translating plates: modeling and analysis. Shanghai University: Shanghai Institute of Applied Mathematics and Mechanics.

25.

Tang

Chen

(2011) Nonlinear free transverse vibrations of in-plane moving plates: without and with internal resonances. Journal of Sound and Vibration 330: 110–126.

26.

Tang

Chen

(2012) Natural frequencies, modes and critical speeds of in-plane moving plates. Advances in Vibration Engineering 11: 229–244.

27.

Tang

Chen

Yang

(2008) Natural frequencies, modes and critical speeds of axially moving Timoshenko beams with different boundary conditions. International Journal of mechanical sciences 50: 1448–1458.

28.

Ulsoy

Mote

CDJr

(1982) Vibration of wide band saw blades. Journal of Engineering for Industry 104: 71–78.

29.

Wang

(1999) Numerical analysis of moving orthotropic thin plates. Computers and Structures 70: 467–486.

30.

Wickert

Mote

CDJr

(1990) Classical vibration analysis of axially moving continua. Journal of Applied Mechanics 57: 738–744.

31.

Zabaras

Pervez

(1989) Viscous damping approximation of laminated anisotropoc composite plates using the finite element method. Computer Methods in Applied Mechanics and Engineering 81: 291–316.

32.

Zhou

Wang

(2007) Vibration of axially moving viscoelastic plate with parabolically varying thickness. Journal of Sound and Vibration 28: 209–218.

33.

Zhou

Wang

(2008) Transverse vibration characteristics of axially moving viscoelastic plate. Journal of Sound and Vibration 316: 198–210.

34.

Zhou

Wang

(2009) Dynamic behaviors of axially moving viscoelastic plate with varying thickness. Journal of Sound and Vibration 22: 276–281.

Vibration characteristic analysis and numerical confirmation of an axially moving plate with viscous damping

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