Analytical modeling for nonlinear vibration analysis of partially cracked thin magneto-electro-elastic plate coupled with fluid

A nonlinear analytical model for the transverse vibration of cracked magneto-electro-elastic (MEE) thin plate is presented using the classical plate theory (CPT). The MEE plate material selected is fiber-reinforced $$\hbox {BaTiO}_{3}$$BaTiO3–$$\hbox {CoFe}_{2}\hbox {O}_{4}$$CoFe2O4 composite, which contains a partial crack at the center. The CPT and the simplified line spring model for crack terms are modified to accommodate the effect of electric and magnetic field rigidities. The analysis considers in-plane forces for the MEE plate, which makes the model nonlinear. The derived governing equation is solved by expressing the transverse displacement in terms of modal coordinates. An approximate solution for forced vibration of cracked MEE plate is also obtained using a perturbation technique. The effect of part-through crack, volume fraction of the composite on the vibration frequencies and structure response is investigated. The frequency response curves presented shows the phenomenon of hard or soft spring. Furthermore, the devised model is extended to the case of cracked MEE plate submerged in fluid. Velocity potential function and Bernoulli’s equation are used to incorporate the inertia effect of surrounding fluid. Both partially and totally submerged plate configurations are considered. The validation of the present results is carried out for intact submerged plate as to the best of the author’s knowledge the literature lacks in results for submerged-cracked plates. New results for cracked MEE plate show that the vibration characteristics are affected by volume fraction, crack length, fluid level and depth of immersion.

[1]  Ernian Pan,et al.  FREE VIBRATIONS OF SIMPLY SUPPORTED AND MULTILAYERED MAGNETO-ELECTRO-ELASTIC PLATES , 2002 .

[2]  M. Porfiri,et al.  Analysis of three-dimensional effects in oscillating cantilevers immersed in viscous fluids , 2013 .

[3]  Biao Wang,et al.  Two collinear interface cracks in magneto-electro-elastic composites , 2004 .

[4]  Marek Krawczuk,et al.  Natural vibrations of rectangular plates with a through crack , 1993, Archive of Applied Mechanics.

[5]  F. Alijani,et al.  Nonlinear vibrations of plates in axial pulsating flow , 2015 .

[6]  Jiangyu Li,et al.  Magnetoelectroelastic multi-inclusion and inhomogeneity problems and their applications in composite materials , 2000 .

[7]  A. Shooshtari,et al.  Vibration Analysis of a Magnetoelectroelastic Rectangular Plate Based on a Higher-Order Shear Deformation Theory , 2016 .

[8]  Alberto Milazzo,et al.  Layer-wise and equivalent single layer models for smart multilayered plates , 2014 .

[9]  E. Pan,et al.  Exact Solution for Simply Supported and Multilayered Magneto-Electro-Elastic Plates , 2001 .

[10]  S. K. Satsangi,et al.  Layer-wise modelling of magneto-electro-elastic plates , 2009 .

[11]  Ernian Pan,et al.  Large deflection of a rectangular magnetoelectroelastic thin plate , 2011 .

[12]  Zhendong Hu,et al.  Free vibration of simply supported and multilayered magneto-electro-elastic plates , 2015 .

[13]  Jiang Jie-sheng,et al.  A finite element model of cracked plates and application to vibration problems , 1991 .

[14]  Mahmoud Haddara,et al.  A study of the dynamic response of submerged rectangular flat plates , 1996 .

[15]  R. B. King,et al.  Elastic-plastic analysis of surface flaws using a simplified line-spring model , 1983 .

[16]  F. Holzweißig,et al.  A. W. Leissa, Vibration of Plates. (Nasa Sp‐160). VII + 353 S. m. Fig. Washington 1969. Office of Technology Utilization National Aeronautics and Space Administration. Preis brosch. $ 3.50 , 1971 .

[17]  Qun Guan,et al.  Three-dimensional analysis of piezoelectric/piezomagnetic elastic media , 2006 .

[18]  L. Keer,et al.  Vibration and stability of cracked rectangular plates , 1972 .

[19]  F. Bakhtiari-Nejad,et al.  Nonlinear vibration analysis of isotropic cantilever plate with viscoelastic laminate , 2009 .

[20]  Jae Hyung Lee,et al.  On-demand, parallel droplet merging method with non-contact droplet pairing in droplet-based microfluidics , 2016 .

[21]  T.-P. Chang Deterministic and random vibration analysis of fluid-contacting transversely isotropic magneto-electro-elastic plates , 2013 .

[22]  Katsutoshi Okazaki,et al.  Vibrarfon of Cracked Rectangular Plates , 1980 .

[23]  Shou-Wen Yu,et al.  Effective properties of layered magneto-electro-elastic composites , 2002 .

[24]  Y. Kerboua,et al.  Vibration analysis of rectangular plates coupled with fluid , 2008 .

[25]  B. Uğurlu Boundary element method based vibration analysis of elastic bottom plates of fluid storage tanks resting on Pasternak foundation , 2016 .

[26]  F. Erdogan,et al.  Interaction of part-through cracks in a flat plate , 1985 .

[27]  M. K. Lim,et al.  A solution method for analysis of cracked plates under vibration , 1994 .

[28]  Feridun Delale,et al.  Line-spring model for surface cracks in a reissner plate , 1981 .

[29]  Takashi Ikeda,et al.  Nonlinear Parametric Vibrations of an Elastic Structure with a Rectangular Liquid Tank , 2003 .

[30]  A. Rawani,et al.  Effect of fibre orientation on non-linear vibration of partially cracked thin rectangular orthotropic micro plate: An analytical approach , 2016 .

[31]  Matthew P. Cartmell,et al.  Analytical modelling and vibration analysis of cracked rectangular plates with different loading and boundary conditions , 2009 .

[32]  Matthew P. Cartmell,et al.  Analytical Modeling and Vibration Analysis of Partially Cracked Rectangular Plates With Different Boundary Conditions and Loading , 2009 .

[33]  N. Jain,et al.  Analytical modelling for vibration analysis of partially cracked orthotropic rectangular plates , 2015 .

[34]  S. E. Khadem,et al.  INTRODUCTION OF MODIFIED COMPARISON FUNCTIONS FOR VIBRATION ANALYSIS OF A RECTANGULAR CRACKED PLATE , 2000 .

[35]  Korosh Khorshid,et al.  Free vibration analysis of a laminated composite rectangular plate in contact with a bounded fluid , 2013 .

[36]  A. Shooshtari,et al.  Nonlinear Vibration Analysis of Rectangular Magneto-electro-elastic Thin Plates , 2014 .

[37]  J. Rice,et al.  The Part-Through Surface Crack in an Elastic Plate , 1972 .

[38]  Roman Solecki,et al.  Bending vibration of a simply supported rectangular plate with a crack parallel to one edge , 1983 .

[39]  Dong-Ho Yang,et al.  Dynamic modelling and active vibration control of a submerged rectangular plate equipped with piezoelectric sensors and actuators , 2015 .

[40]  Wei Zhang,et al.  Nonlinear dynamic response of a functionally graded plate with a through-width surface crack , 2010 .

[41]  A. Shooshtari,et al.  Nonlinear free and forced vibrations of anti-symmetric angle-ply hybrid laminated rectangular plates , 2014 .

[42]  Chunli Zhang Discussion: “Closed Form Expression for the Vibration Problem of a Transversely Isotropic Magneto-Electro-Elastic Plate” (Liu, M. F., and Chang, T. P., 2010, ASME J. Appl. Mech., 77, 024502) , 2013 .

[43]  Alberto Milazzo,et al.  Refined equivalent single layer formulations and finite elements for smart laminates free vibrations , 2014 .

[44]  Shahrokh Hosseini-Hashemi,et al.  Natural frequencies of rectangular Mindlin plates coupled with stationary fluid , 2012 .

[45]  S. Timoshenko,et al.  THEORY OF PLATES AND SHELLS , 1959 .

[46]  Carlos A. Mota Soares,et al.  Analyses of magneto-electro-elastic plates using a higher order finite element model , 2009 .

[47]  W. Q. Chen,et al.  Alternative state space formulations for magnetoelectric thermoelasticity with transverse isotropy and the application to bending analysis of nonhomogeneous plates , 2003 .

[48]  M. Cartmell,et al.  An investigation into the vibration analysis of a plate with a surface crack of variable angular orientation , 2012 .

[49]  H. Berger A new approach to the analysis of large deflections of plates , 1954 .

[50]  N. K. Jain,et al.  Analytical modeling and vibration analysis of internally cracked rectangular plates , 2014 .

[51]  K. Avramov,et al.  Effect of boundary condition nonlinearities on free large-amplitude vibrations of rectangular plates , 2013 .

[52]  Mei-Feng Liu,et al.  An exact deformation analysis for the magneto-electro-elastic fiber-reinforced thin plate , 2011 .

[53]  J. Antaki,et al.  Design of microfluidic channels for magnetic separation of malaria-infected red blood cells , 2016, Microfluidics and nanofluidics.

[54]  T.-P. Chang,et al.  Closed Form Expression for the Vibration Problem of a Transversely Isotropic Magneto-Electro-Elastic Plate , 2010 .

[55]  Yansong Li,et al.  Free vibration analysis of magnetoelectroelastic plate resting on a Pasternak foundation , 2014 .

[56]  G. Rezazadeh,et al.  Coupled vibrations of a magneto-electro-elastic micro-diaphragm in micro-pumps , 2016 .

[57]  Weiqiu Chen,et al.  On free vibration of non-homogeneous transversely isotropic magneto-electro-elastic plates , 2005 .

[58]  Nikola Vladimir,et al.  Natural vibration analysis of rectangular bottom plate structures in contact with fluid , 2015 .

[59]  Ernian Pan,et al.  Discrete Layer Solution to Free Vibrations of Functionally Graded Magneto-Electro-Elastic Plates , 2006 .

[60]  T.-P. Chang On the natural frequency of transversely isotropic magneto-electro-elastic plates in contact with fluid , 2013 .

[61]  A. Mohanty,et al.  Vibration analysis of a rectangular thin isotropic plate with a part-through surface crack of arbitrary orientation and position , 2013 .

[62]  N. Jain,et al.  Effect of microstructure on vibration characteristics of partially cracked rectangular plates based on a modified couple stress theory , 2015 .

[63]  Tsung-Lin Wu,et al.  Closed-form solutions for the magnetoelectric coupling coefficients in fibrous composites with piezoelectric and piezomagnetic phases , 2000 .

[64]  Jie Yang,et al.  Free vibration of size-dependent magneto-electro-elastic nanoplates based on the nonlocal theory , 2014 .

[65]  Alireza Shooshtari,et al.  Nonlinear free vibration of magneto-electro-elastic rectangular plates , 2015 .

[66]  N. K. Jain,et al.  Analytical modeling for vibration analysis of thin rectangular orthotropic/functionally graded plates with an internal crack , 2015 .

[67]  Y. Wang,et al.  Study on the Dynamic Behavior of Axially Moving Rectangular Plates Partially Submersed in Fluid , 2015 .

[68]  N. K. Jain,et al.  Effect of thermal environment on free vibration of cracked rectangular plate: An analytical approach , 2015 .

[69]  Ernian Pan,et al.  Free vibration response of two-dimensional magneto-electro-elastic laminated plates , 2006 .

[70]  E. Esmailzadeh,et al.  Nonlinear vibration analysis of isotropic plate with inclined part-through surface crack , 2014 .

[71]  Zeng Zhao-jing,et al.  Stress intensity factors for an inclined surface crack under biaxial stress state , 1994 .

[72]  Alberto Milazzo,et al.  An equivalent single-layer model for magnetoelectroelastic multilayered plate dynamics , 2012 .

[73]  E. Pan,et al.  On the longitudinal wave along a functionally graded magneto-electro-elastic rod , 2013 .