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Size-Dependent Geometrically Nonlinear Forced Vibration Analysis of Functionally Graded First-Order Shear Deformable Microplates

Published online by Cambridge University Press:  04 April 2016

R. Ansari ,
R. Gholami  and
A. Shahabodini
R. Ansari*
Affiliation:
Department of Mechanical EngineeringUniversity of GuilanRasht, Iran
R. Gholami*
Affiliation:
Department of Mechanical EngineeringLahijan BranchIslamic Azad UniversityLahijan, Iran
A. Shahabodini
Affiliation:
Department of Mechanical EngineeringUniversity of GuilanRasht, Iran
*
**Corresponding author (r_ansari@guilan.ac.ir)
*Corresponding author (gholami_r@liau.ac.ir)
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Abstract

In this paper, a non-classical plate model capturing the size effect is developed to study the forced vibration of functionally graded (FG) microplates subjected to a harmonic excitation transverse force. To this, the modified couple stress theory (MCST) is incorporated into the first-order shear deformation plate theory (FSDPT) to account for the size effect through one length scale parameter, only. Strong form of nonlinear governing equations and associated boundary conditions are obtained using Hamilton's principle. The solution process is implemented on two domains. The generalized differential quadrature (GDQ) method is first employed to discretize the governing equations on the space domain. A Galerkin-based scheme is then applied to extract a reduced set of the nonlinear equations of Duffing-type. On the second domain, through a time differentiation matrix operator, the set of ordinary differential equations are transformed into the discrete form on time domain. Eventually, a system of the parameterized nonlinear equations is acquired and solved via the pseudo-arc length continuation method. The frequency response curve of the microplate is sketched and the effects of various material and geometrical parameters on it are evaluated.

Keywords

Nonlinear forced vibration of FG microplateModified couple stress theoryGDQPseudoarc length method
Type
Research Article
Information
Journal of Mechanics , Volume 32 , Issue 5 , October 2016 , pp. 539 - 554
Copyright
Copyright © The Society of Theoretical and Applied Mechanics 2016 

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References

1. Gao, Y., Brennan, M. J., Joseph, P., Muggleton, J. and Hunaidi, O., “On the Selection of Acoustic/Vibration Sensors for Leak Detection in Plastic Water Pipes,” Journal of Sound and Vibration, 283, pp. 927941 (2005).CrossRefGoogle Scholar
2. Vogl, A., et al., “Design, Process and Characterisation of a High-Performance Vibration Sensor for Wireless Condition Monitoring,” Sensors and Actuators A: Physical, 153, pp. 155161 (2009).Google Scholar
3. Li, M., Tang, H. X. and Roukes, M. L., “Ultra-Sensitive NEMS-Based Cantilevers for Sensing, Scanned Probe and Very High-Frequency Applications,” Nature Nanotechnology, 2, pp. 114120 (2007).Google Scholar
4. Rinaldi, S., Prabhakar, S., Vengallatore, S. and Païdoussis, M. P., “Dynamics of Microscale Pipes Containing Internal Fluid Flow: Damping, Frequency Shift, and Stability,” Journal of Sound and Vibration, 329, pp. 10811088 (2010).Google Scholar
5. Ma, Q. and Clarke, D. R., “Size Dependent Hardness of Silver Single Crystals,” Journal of Materials Re-Search, 10, pp. 853863 (1995).Google Scholar
6. McFarland, A. W. and Colton, J. S., “Role of Material Microstructure in Plate Stiffness with Relevance to Microcantilever Sensors,” Journal of Micromechanics and Microengineering, 15, p. 1060 (2005).Google Scholar
7. Mindlin, R. and Tiersten, H., “Effects of Cou-Ple-Stresses in Linear Elasticity,” Archive for Rational Mechanics and Analysis, 11, pp. 415448 (1962).Google Scholar
8. Eringen, A. C., “On Differential Equations of Non-Local Elasticity and Solutions of Screw Dislocation and Surface Waves,” Journal of Applied Physics, 54, pp. 47034710 (1983).Google Scholar
9. Aifantis, E., “Strain Gradient Interpretation of Size Effects,” International Journal of Fracture, 95, pp. 299314 (1999).Google Scholar
10. Yang, F., Chong, A., Lam, D. and Tong, P., “Couple Stress Based Strain Gradient Theory for Elasticity,” International Journal of Solids and Structures, 39, pp. 27312743 (2002).Google Scholar
11. Şimşek, M., “Nonlinear Static and Free Vibration Analysis of Microbeams Based on the Nonlinear Elastic Foundation Using Modified Couple Stress Theory and He's Variational Method,” Composite Structures, 112, pp. 264272 (2014).Google Scholar
12. Akgöz, B. and Civalek, Ö., “Strain Gradient Elasticity and Modified Couple Stress Models for Buckling Analysis of Axially Loaded Micro-Scaled Beams,” International Journal of Engineering Science, 49, pp. 12681280 (2011).CrossRefGoogle Scholar
13. Akgöz, B. and Civalek, Ö., “Modeling and Analysis of Micro-Sized Plates Resting on Elastic Medium Using the Modified Couple Stress Theory,” Meccanica, 48, pp. 863873 (2013).CrossRefGoogle Scholar
14. Sedighi, H. M., Chan-Gizian, M. and Noghreha-Badi, A., “Dynamic Pull-In Instability of Geometrically Nonlinear Actuated Micro-Beams Based on the Modified Couple Stress Theory,” Latin American Journal of Solids and Structures, 11, pp. 810825 (2014).Google Scholar
15. Zhou, S. and Li, Z., “Length Scales in the Static and Dynamic Torsion of a Circular Cylindrical Micro-Bar,” Journal of Shandong University of Technology, 31, pp. 401407 (2001).Google Scholar
16. Asghari, M., Kahrobaiyan, M. and Ahmadian, M., “A Nonlinear Timoshenko Beam Formulation Based on the Modified Couple Stress Theory,” International Journal of Engineering Science, 48, pp. 17491761 (2010).Google Scholar
17. Gao, X.-L. and Zhang, G., “A Non-Classical Kirchhoff Plate Model Incorporating Microstructure, Surface Energy and Foundation Effects,” Continuum Mechanics and Thermodynamics, pp. 119 (2015).Google Scholar
18. Ma, H., Gao, X.-L. and Reddy, J., “A Microstructure-Dependent Timoshenko Beam Model Based on a Modified Couple Stress Theory,” Journal of the Mechanics and Physics of Solids, 56, pp. 33793391 (2008).Google Scholar
19. Kong, S., Zhou, S., Nie, Z. and Wang, K., “The Size-Dependent Natural Frequency of Bernoulli–Euler Micro-Beams,” International Journal of Engineering Science, 46, pp. 427437 (2008).Google Scholar
20. Yin, L., Qian, Q., Wang, L. and Xia, W., “Vibration Analysis of Microscale Plates Based on Modified Couple Stress Theory,” Acta Mechanica Solida Sinica, 23, pp. 386393 (2010).Google Scholar
21. Asghari, M., Ahmadian, M., Kahrobaiyan, M. and Rahaeifard, M., “On the Size-Dependent Behavior of Functionally Graded Micro-Beams,” Materials & Design, 31, pp. 23242329 (2010).Google Scholar
22. Asghari, M., Rahaeifard, M., Kahrobaiyan, M. and Ahmadian, M., “The Modified Couple Stress Functionally Graded Timoshenko Beam Formulation,” Materials & Design, 32, pp. 14351443 (2011).Google Scholar
23. Jomehzadeh, E., Noori, H. and Saidi, A., “The Size-Dependent Vibration Analysis of Micro-Plates Based on a Modified Couple Stress Theory,” Physica E: Low-dimensional Systems and Nanostructures, 43, pp. 877883 (2011).Google Scholar
24. Ansari, R., Gholami, R. and Sahmani, S., “Free Vibration Analysis of Size-Dependent Functionally Graded Microbeams Based on the Strain Gradient Timoshenko Beam Theory,” Composite Structures, 94, pp. 221228 (2011).Google Scholar
25. Ansari, R., Shojaei, M. F., Mohammadi, V., Gholami, R. and Rouhi, H., “Nonlinear Vibration Analysis of Microscale Functionally Graded Timoshenko Beams using the Most General form of Strain Gradient Elasticity,” Journal of Mechanics, 30, pp. 161172 (2014).Google Scholar
26. Ke, L.-L. and Wang, Y.-S., “Size Effect on Dynamic Stability of Functionally Graded Microbeams Based on a Modified Couple Stress Theory,” Composite Structures, 93, pp. 342350 (2011).Google Scholar
27. Moeenfard, H., Mojahedi, M. and Ahmadian, M. T., “A Homotopy Perturbation Analysis of Nonlinear Free Vibration of Timoshenko Microbeams,” Journal of Mechanical Science and Technology, 25, pp. 557565 (2011).Google Scholar
28. Ke, L.-L., Wang, Y.-S., Yang, J. and Kitipornchai, S., “Free Vibration of Size-Dependent Mindlin Micro-Plates Based on the Modified Couple Stress Theory,” Journal of Sound and Vibration, 331, pp. 94106 (2012).Google Scholar
29. Salamat-Talab, M., Nateghi, A. and Torabi, J., “Static and Dynamic Analysis of Third-Order Shear Deformation FG Micro Beam Based on Modified Couple Stress Theory,” International Journal of Mechanical Sciences, 57, pp. 6373 (2012).Google Scholar
30. Ke, L.-L., Wang, Y.-S., Yang, J. and Kitipornchai, S., “Nonlinear Free Vibration of Size-Dependent Functionally Graded Microbeams,” International Journal of Engineering Science, 50, pp. 256267 (2012).CrossRefGoogle Scholar
31. Thai, H.-T. and Choi, D.-H., “Size-Dependent Functionally Graded Kirchhoff and Mindlin Plate Models Based on a Modified Couple Stress Theory,” Composite Structures, 95, pp. 142153 (2013).Google Scholar
32. Ansari, R., Gholami, R., Mohammadi, V. and Shojaei, M. F., “Size-Dependent Pull-In Instability of Hydro-Statically and Electrostatically Actuated Circular Microplates,” Journal of Computational and Nonlinear Dynamics, 8, p. 021015 (2013).Google Scholar
33. Ke, L., Yang, J., Kitipornchai, S., Bradford, M. and Wang, Y., “Axisymmetric Nonlinear Free Vibration of Size-Dependent Functionally Graded Annular Micro-Plates,” Composites Part B: Engineering, 53, pp. 207217 (2013).Google Scholar
34. Gholami, R., Ansari, R., Darvizeh, A. and Sahmani, S., “Axial Buckling and Dynamic Stability of Functionally Graded Microshells Based on the Modified Couple Stress Theory,” International Journal of Structural Stability and Dynamics, 15, pp. 1450070 (2015).Google Scholar
35. Gholipour, A., Farokhi, H. and Ghayesh, M. H., “In-Plane and Out-of-Plane Nonlinear Size-Dependent Dynamics of Microplates,” Nonlinear Dynamics, 79, pp. 17711785 (2014).Google Scholar
36. Wang, Y.-G., Lin, W.-H. and Zhou, C.-L., “Nonlinear Bending of Size-Dependent Circular Microplates Based on the Modified Couple Stress Theory,” Archive of Applied Mechanics, 84, pp. 391400 (2014).Google Scholar
37. Shaat, M., Mahmoud, F., Gao, X.-L. and Faheem, A. F., “Size-Dependent Bending Analysis of Kirchhoff Nano-Plates Based on a Modified Couple-Stress Theory Including Surface Effects,” International Journal of Mechanical Sciences, 79, pp. 3137 (2014).Google Scholar
38. Ansari, R., Gholami, R., Shojaei, M. F., Mohammadi, V. and Darabi, M., “Size-Dependent Nonlinear Bending and Postbuckling of Functionally Graded Mindlin Rectangular Microplates Considering the Physical Neutral Plane Position,” Composite Structures, 127, pp. 8798 (2015).Google Scholar
39. Ghayesh, M. H. and Farokhi, H., “Nonlinear Dynamics of Microplates,” International Journal of Engineering Science, 86, pp. 6073 (2015).Google Scholar
40. Fares, M. E., Elmarghany, M. K. and Atta, D., “An Efficient and Simple Refined Theory for Bending and Vibration of Functionally Graded Plates,” Composite Structures, 91, pp. 296305 (2009).CrossRefGoogle Scholar
41. Shu, C., Differential Quadrature and Its Application in Engineering, Springer Science & Business Media (2000).Google Scholar
42. Ibrahim, S., Patel, B. and Nath, Y., “Modified Shooting Approach to the Non-linear Periodic Forced Response of Isotropic/Composite Curved Beams,” International Journal of Non-Linear Mechanics, 44, pp. 10731084 (2009).Google Scholar
43. Trefethen, L. N., Spectral Methods in MATLAB, Siam (2000).Google Scholar
44. Keller, H. B., “Numerical Solution of Bifurcation and Nonlinear Eigenvalue Problems, Applications of Bi-Furcation Theory,” Proc. Advanced Sem., Univ. Wisconsin, Madison, Wis., Academic Press, New York, pp. 359384 (1977).Google Scholar
45. Amabili, M., Nonlinear Vibrations and Stability of Shells and Plates, Cambridge University Press, Cambridge (2008).Google Scholar