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Journal of Electromagnetic Waves and Applications Volume 32, 2018 - Issue 15
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Original Articles

On wave dispersion characteristics of double-layered graphene sheets in thermal environments

Farzad EbrahimiDepartment of Mechanical Engineering, Faculty of Engineering, Imam Khomeini International University, Qazvin, IranCorrespondence[email protected]
&
Ali DabbaghFaculty of Mechanical Engineering, College of Engineering, University of Tehran, Tehran, Iran
Pages 1869-1888 | Received 06 Sep 2017, Accepted 19 Nov 2017, Published online: 02 Jan 2018

References

  • Ebrahimi F , Salari E . Thermal buckling and free vibration analysis of size dependent Timoshenko FG nanobeams in thermal environments. Compos Struct. 2015;128:363–380.10.1016/j.compstruct.2015.03.023
  • Eringen AC . Linear theory of nonlocal elasticity and dispersion of plane waves. Int J Eng Sci. 1972;10(5):425–435.10.1016/0020-7225(72)90050-X
  • Eringen AC . On differential equations of nonlocal elasticity and solutions of screw dislocation and surface waves. J Appl Phys. 1983;54(9):4703–4710.10.1063/1.332803
  • Wang Q , Varadan VK . Application of nonlocal elastic shell theory in wave propagation analysis of carbon nanotubes. Smart Mater Struct. 2007;16(1):178–190.10.1088/0964-1726/16/1/022
  • Reddy JN , Pang SD . Nonlocal continuum theories of beams for the analysis of carbon nanotubes. J Appl Phys. 2008;103(2):023511.10.1063/1.2833431
  • Aydogdu M . A general nonlocal beam theory: Its application to nanobeam bending, buckling and vibration. Phys E. 2009;41(9):1651–1655.10.1016/j.physe.2009.05.014
  • Wang YZ , Li FM , Kishimoto K . Scale effects on the longitudinal wave propagation in nanoplates. Phys E. 2010;42(5):1356–1360.10.1016/j.physe.2009.11.036
  • Malekzadeh P , Setoodeh AR , Alibeygi Beni A . Small scale effect on the free vibration of orthotropic arbitrary straight-sided quadrilateral nanoplates. Compos Struct. 2011;93(7):1631–1639.10.1016/j.compstruct.2011.01.008
  • Narendar S , Gopalakrishnan S . Temperature effects on wave propagation in nanoplates. Compos Part B Eng. 2012;43(3):1275–1281.10.1016/j.compositesb.2011.11.029
  • Narendar S , Gopalakrishnan S . Study of terahertz wave propagation properties in nanoplates with surface and small-scale effects. Int J Mech Sci. 2012;64(1):221–231.10.1016/j.ijmecsci.2012.06.012
  • Eltaher MA , Alshorbagy AE , Mahmoud FF . Vibration analysis of Euler–Bernoulli nanobeams by using finite element method. Appl Math Model. 2013;37(7):4787–4797.10.1016/j.apm.2012.10.016
  • Rahmani O , Pedram O . Analysis and modeling the size effect on vibration of functionally graded nanobeams based on nonlocal Timoshenko beam theory. Int J Eng Sci. 2014;77:55–70.10.1016/j.ijengsci.2013.12.003
  • Daneshmehr A , Rajabpoor A . Stability of size dependent functionally graded nanoplate based on nonlocal elasticity and higher order plate theories and different boundary conditions. Int J Eng Sci. 2014;82:84–100.10.1016/j.ijengsci.2014.04.017
  • Daneshmehr A , Rajabpoor A , Hadi A . Size dependent free vibration analysis of nanoplates made of functionally graded materials based on nonlocal elasticity theory with high order theories. Int J Eng Sci. 2015;95:23–35.10.1016/j.ijengsci.2015.05.011
  • Ebrahimi F , Salari E . Thermo-mechanical vibration analysis of a single-walled carbon nanotube embedded in an elastic medium based on higher-order shear deformation beam theory. J Mech Sci Technol. 2015;29(9):3797–3803.10.1007/s12206-015-0826-2
  • Ebrahimi F , Shaghaghi GR , Boreiry M . An investigation into the influence of thermal loading and surface effects on mechanical characteristics of nanotubes. Struct Eng Mech. 2016;57(1):179–200.10.12989/sem.2016.57.1.179
  • Ghadiri M , Shafiei N . Nonlinear bending vibration of a rotating nanobeam based on nonlocal Eringen’s theory using differential quadrature method. Microsyst Technol. 2016;22(12):2853–2867.10.1007/s00542-015-2662-9
  • Ebrahimi F , Barati MR . A nonlocal higher-order shear deformation beam theory for vibration analysis of size-dependent functionally graded nanobeams. Arabian J Sci Eng. 2016;41(5):1679–1690.10.1007/s13369-015-1930-4
  • Ebrahimi F , Ghasemi F , Salari E . Investigating thermal effects on vibration behavior of temperature-dependent compositionally graded Euler beams with porosities. Meccanica. 2016;51(1):223–249.10.1007/s11012-015-0208-y
  • Ebrahimi F , Barati MR . Effect of three-parameter viscoelastic medium on vibration behavior of temperature-dependent non-homogeneous viscoelastic nanobeams in hygrothermal environment. Mech Adv Mater Struct. 2017;1–14.
  • Ebrahimi F , Barati MR . Vibration analysis of nonlocal beams made of functionally graded material in thermal environment. Eur Phys J Plus. 2016;131(8):279.10.1140/epjp/i2016-16279-y
  • Ebrahimi F , Barati MR . A unified formulation for dynamic analysis of nonlocal heterogeneous nanobeams in hygro-thermal environment. Appl Phys A. 2016;122(9):792.10.1007/s00339-016-0322-2
  • Ebrahimi F , Barati MR , Haghi P . Nonlocal thermo-elastic wave propagation in temperature-dependent embedded small-scaled nonhomogeneous beams. Eur Phys J Plus. 2016;131(11):383.10.1140/epjp/i2016-16383-0
  • Ebrahimi F , Barati MR , Dabbagh A . Wave dispersion characteristics of axially loaded magneto-electro-elastic nanobeams. Appl Phys A. 2016;122(11):949.10.1007/s00339-016-0465-1
  • Ebrahimi F , Dabbagh A , Barati MR . Wave propagation analysis of a size-dependent magneto-electro-elastic heterogeneous nanoplate. Eur Phys J Plus. 2016;131(12):433.10.1140/epjp/i2016-16433-7
  • Ebrahimi F , Barati MR . Static stability analysis of smart magneto-electro-elastic heterogeneous nanoplates embedded in an elastic medium based on a four-variable refined plate theory. Smart Mater Struct. 2016;25(10):105014.10.1088/0964-1726/25/10/105014
  • Ebrahimi F , Barati MR . Thermal buckling analysis of size-dependent FG nanobeams based on the third-order shear deformation beam theory. Acta Mech Solida Sin. 2016;29(5):547–554.10.1016/S0894-9166(16)30272-5
  • Ebrahimi F , Barati MR . Magneto-electro-elastic buckling analysis of nonlocal curved nanobeams. Eur Phys J Plus. 2016;131(9):346.10.1140/epjp/i2016-16346-5
  • Ebrahimi F , Barati MR . A nonlocal higher-order refined magneto-electro-viscoelastic beam model for dynamic analysis of smart nanostructures. Int J Eng Sci. 2016;107:183–196.10.1016/j.ijengsci.2016.08.001
  • Ebrahimi F , Hosseini SHS . Thermal effects on nonlinear vibration behavior of viscoelastic nanosize plates. J Therm Stresses. 2016;39(5):606–625.10.1080/01495739.2016.1160684
  • Ebrahimy F , Hosseini SHS . Nonlinear electroelastic vibration analysis of NEMS consisting of double-viscoelastic nanoplates. Appl Phys A. 2016;122(10):922.10.1007/s00339-016-0452-6
  • Ebrahimi F , Dabbagh A . Wave propagation analysis of smart rotating porous heterogeneous piezo-electric nanobeams. Eur Phys J Plus. 2017;132:1–15.
  • Ebrahimi F , Barati MR . Vibration analysis of viscoelastic inhomogeneous nanobeams incorporating surface and thermal effects. Appl Phys A. 2017;123(1):5.10.1007/s00339-016-0511-z
  • Ebrahimi F , Barati MR . Hygrothermal effects on vibration characteristics of viscoelastic FG nanobeams based on nonlocal strain gradient theory. Compos Struct. 2017;159:433–444.10.1016/j.compstruct.2016.09.092
  • Ebrahimi F , Barati MR . Buckling analysis of smart size-dependent higher order magneto-electro-thermo-elastic functionally graded nanosize beams. J Mech. 2017;33(1):23–33.10.1017/jmech.2016.46
  • Ebrahimi F , Barati MR , Dabbagh A . Wave propagation in embedded inhomogeneous nanoscale plates incorporating thermal effects. Waves Random Complex Media. 2017;1–21.
  • Ebrahimi F , Salari E . Semi-analytical vibration analysis of functionally graded size-dependent nanobeams with various boundary conditions. Smart Struct Syst. 2017;19(3):243–257.10.12989/sss.2017.19.3.243
  • Ebrahimi F , Barati MR , Zenkour AM . Vibration analysis of smart embedded shear deformable nonhomogeneous piezoelectric nanoscale beams based on nonlocal elasticity theory. Int J Aeronaut Space Sci. 2017;18(2):255–269.
  • Ebrahimi F , Barati MR . Static stability analysis of embedded flexoelectric nanoplates considering surface effects. Appl Phys A. 2017;123(10):666.10.1007/s00339-017-1265-y
  • Ebrahimi F , Barati MR . Modeling of smart magnetically affected flexoelectric/piezoelectric nanostructures incorporating surface effects. Nanomater Nanotechnol. 2017;7. DOI:10.1177/1847980417713106
  • Ebrahimi F , Barati MR . A general higher-order nonlocal couple stress based beam model for vibration analysis of porous nanocrystalline nanobeams. Superlattices Microstruct. 2017;112:64–78.
  • Ebrahimi F , Barati MR . Influence of neutral surface position on dynamic characteristics of in-homogeneous piezo-magnetically actuated nanoscale plates. Comput Mater Sci. 2017. DOI:10.1177/0954406217728977
  • Li L , Hu Y . Buckling analysis of size-dependent nonlinear beams based on a nonlocal strain gradient theory. Int J Eng Sci. 2015;97:84–94.10.1016/j.ijengsci.2015.08.013
  • Li L , Li X , Hu Y . Free vibration analysis of nonlocal strain gradient beams made of functionally graded material. Int J Eng Sci. 2016;102:77–92.
  • Li L , Hu Y . Nonlinear bending and free vibration analyses of nonlocal strain gradient beams made of functionally graded material. Int J Eng Sci. 2016;107:77–97.
  • Şimşek M . Nonlinear free vibration of a functionally graded nanobeam using nonlocal strain gradient theory and a novel Hamiltonian approach. Int J Eng Sci. 2016;105:12–27.10.1016/j.ijengsci.2016.04.013
  • Ebrahimi F , Barati MR , Dabbagh A . A nonlocal strain gradient theory for wave propagation analysis in temperature-dependent inhomogeneous nanoplates. Int J Eng Sci. 2016;107:169–182.10.1016/j.ijengsci.2016.07.008
  • Ebrahimi F , Dabbagh A . Wave dispersion characteristics of rotating heterogeneous magneto-electro-elastic nanobeams based on nonlocal strain gradient elasticity theory. J Electromagn Waves Appl. 2017;32:1–32.
  • Ebrahimi F , Dabbagh A . Wave propagation analysis of embedded nanoplates based on a nonlocal strain gradient-based surface piezoelectricity theory. Eur Phys J Plus. 2017;132(11):449.
  • Ebrahimi F , Dabbagh A . On flexural wave propagation responses of smart FG magneto-electro-elastic nanoplates via nonlocal strain gradient theory. Compos Struct. 2017;162:281–293.10.1016/j.compstruct.2016.11.058
  • Ebrahimi F , Dabbagh A . Nonlocal strain gradient based wave dispersion behavior of smart rotating magneto-electro-elastic nanoplates. Mater Res Express. 2017;4(2):025003.10.1088/2053-1591/aa55b5
  • Ebrahimi F , Haghi P . Wave propagation analysis of rotating thermoelastically-actuated nanobeams based on nonlocal strain gradient theory. Acta Mechan Solida Sin. 2017.
  • Shahverdi H , Barati MR . Vibration analysis of porous functionally graded nanoplates. Int J Eng Sci. 2017;120:82–99.10.1016/j.ijengsci.2017.06.008
  • Arani AG , Jalaei MH . Nonlocal dynamic response of embedded single-layered graphene sheet via analytical approach. J Eng Math. 2016;98(1):129–144.10.1007/s10665-015-9814-x
  • Lee C , Wei X , Kysar JW , et al . Measurement of the elastic properties and intrinsic strength of monolayer graphene. Science. 2008;321(5887):385–388.10.1126/science.1157996
  • Seol JH , Jo I , Moore AL , et al . Two-dimensional phonon transport in supported graphene. Science. 2010;328(5975):213–216.10.1126/science.1184014
  • Liew KM , He XQ , Kitipornchai S . Predicting nanovibration of multi-layered graphene sheets embedded in an elastic matrix. Acta Mater. 2006;54(16):4229–4236.10.1016/j.actamat.2006.05.016
  • Murmu T , Pradhan SC . Vibration analysis of nano-single-layered graphene sheets embedded in elastic medium based on nonlocal elasticity theory. J Appl Phys. 2009;105(6):064319.10.1063/1.3091292
  • Pradhan SC , Phadikar JK . Small scale effect on vibration of embedded multilayered graphene sheets based on nonlocal continuum models. Phys Lett A. 2009;373(11):1062–1069.10.1016/j.physleta.2009.01.030
  • Pradhan SC , Murmu T . Small scale effect on the buckling analysis of single-layered graphene sheet embedded in an elastic medium based on nonlocal plate theory. Phys E. 2010;42(5):1293–1301.10.1016/j.physe.2009.10.053
  • Ansari R , Rajabiehfard R , Arash B . Nonlocal finite element model for vibrations of embedded multi-layered graphene sheets. Comput Mater Sci. 2010;49(4):831–838.10.1016/j.commatsci.2010.06.032
  • Ansari R , Arash B , Rouhi H . Vibration characteristics of embedded multi-layered graphene sheets with different boundary conditions via nonlocal elasticity. Compos Struct. 2011;93(9):2419–2429.10.1016/j.compstruct.2011.04.006
  • Pradhan SC , Kumar A . Vibration analysis of orthotropic graphene sheets using nonlocal elasticity theory and differential quadrature method. Compos Struct. 2011;93(2):774–779.10.1016/j.compstruct.2010.08.004
  • Rouhi S , Ansari R . Atomistic finite element model for axial buckling and vibration analysis of single-layered graphene sheets. Phys E. 2012;44(4):764–772.10.1016/j.physe.2011.11.020
  • Natsuki T , Shi JX , Ni QQ . Buckling instability of circular double-layered graphene sheets. J Phys Condens Matter. 2012;24(13):135004.
  • Arani AG , Kolahchi R , Barzoki AAM , et al . Elastic foundation effect on nonlinear thermo-vibration of embedded double-layered orthotropic graphene sheets using differential quadrature method. Proc Inst Mech Eng Part C J Mech Eng Sci. 2013;227(4):862–879.
  • Murmu T , McCarthy MA , Adhikari S . In-plane magnetic field affected transverse vibration of embedded single-layer graphene sheets using equivalent nonlocal elasticity approach. Compos Struct. 2013;96:57–63.10.1016/j.compstruct.2012.09.005
  • Naderi A , Saidi AR . Nonlocal postbuckling analysis of graphene sheets in a nonlinear polymer medium. Int J Eng Sci. 2014;81:49–65.10.1016/j.ijengsci.2014.04.004
  • Farajpour A , Solghar AA , Shahidi A . Postbuckling analysis of multi-layered graphene sheets under non-uniform biaxial compression. Phys E. 2013;47:197–206.10.1016/j.physe.2012.10.028
  • Anjomshoa A , Shahidi AR , Hassani B , et al . Finite element buckling analysis of multi-layered graphene sheets on elastic substrate based on nonlocal elasticity theory. Appl Math Model. 2014;38(24):5934–5955.10.1016/j.apm.2014.03.036
  • Wang Y , Li FM , Wang YZ . Nonlinear vibration of double layered viscoelastic nanoplates based on nonlocal theory. Phys E. 2015;67:65–76.10.1016/j.physe.2014.11.007
  • Hashemi SH , Mehrabani H , Ahmadi-Savadkoohi A . Exact solution for free vibration of coupled double viscoelastic graphene sheets by viscoPasternak medium. Compos Part B Eng. 2015;78:377–383.10.1016/j.compositesb.2015.04.008
  • Arani AG , Haghparast E , Zarei HB . Nonlocal vibration of axially moving graphene sheet resting on orthotropic visco-Pasternak foundation under longitudinal magnetic field. Phys B Condens Matter. 2016;495:35–49.10.1016/j.physb.2016.04.039
  • Arani AG , Jalaei MH . Transient behavior of an orthotropic graphene sheet resting on orthotropic visco-Pasternak foundation. Int J Eng Sci. 2016;103:97–113.10.1016/j.ijengsci.2016.02.006
  • Zenkour AM . Nonlocal transient thermal analysis of a single-layered graphene sheet embedded in viscoelastic medium. Phys E. 2016;79:87–97.10.1016/j.physe.2015.12.003
  • Ebrahimi F , Shafiei N . Influence of initial shear stress on the vibration behavior of single-layered graphene sheets embedded in an elastic medium based on Reddy’s higher-order shear deformation plate theory. Mech Adv Mater Struct. 2017;24(9):761–772.10.1080/15376494.2016.1196781
  • Ebrahimi F , Barati MR . Vibration analysis of nonlocal strain gradient embedded single-layer graphene sheets under nonuniform in-plane loads. J Vibr Cont. 2017. DOI: 10.1177/1077546317734083
  • Ebrahimi F , Barati MR . Damping vibration analysis of graphene sheets on viscoelastic medium incorporating hygro-thermal effects employing nonlocal strain gradient theory. Compos Struct. 2017;185:241–253.
  • Arash B , Wang Q , Liew KM . Wave propagation in graphene sheets with nonlocal elastic theory via finite element formulation. Comput Meth Appl Mech Eng. 2012;223:1–9.10.1016/j.cma.2012.02.002
  • Liu H , Yang JL . Elastic wave propagation in a single-layered graphene sheet on two-parameter elastic foundation via nonlocal elasticity. Phys E. 2012;44(7):1236–1240.10.1016/j.physe.2012.01.018
  • Shi JX , Ni QQ , Lei XW , et al . Study on wave propagation characteristics of double-layer graphene sheets via nonlocal Mindlin–Reissner plate theory. Int J Mech Sci. 2014;84:25–30.10.1016/j.ijmecsci.2014.04.008
  • Xiao W , Li L , Wang M . Propagation of in-plane wave in viscoelastic monolayer graphene via nonlocal strain gradient theory. Appl Phys A. 2017;123(6):388.
  • Natarajan S , Chakraborty S , Thangavel M , et al . Size-dependent free flexural vibration behavior of functionally graded nanoplates. Comput Mater Sci. 2012;65:74–80.10.1016/j.commatsci.2012.06.031

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