• Title of article

    Nonlocal nonlinear rst-order shear deformable beam model for post-buckling analysis of magneto-electro-thermo-elastic nanobeams

  • Author/Authors

    Ansari, R Department of Mechanical Engineering - University of Guilan , Gholami, R Department of Mechanical Engineering - Lahijan Branch Islamic Azad University

  • Pages
    16
  • From page
    3099
  • To page
    3114
  • Abstract
    Abstract. In this study, the size-dependent post-buckling behavior of Magneto-Electro-Thermo-Elastic (METE) nanobeams with dierent edge supports is investigated. Based on the nonlocal rst-order shear deformation beam theory and considering the von Karman hypothesis, a size-dependent nonlinear METE nanobeam model is developed, in which the eects of small-scale parameter and thermo-electro-magnetic-mechanical loadings are incorporated. A numerical solution procedure based on the Generalized Dierential Quadrature (GDQ) and pseudo arc-length continuation methods is utilized to describe the size-dependent post-buckling behavior of METE nanobeams under various boundary conditions. The eects of dierent parameters such as nonlocal parameter, external electric voltage, external magnetic potential, and temperature rise on the post-buckling path of METE nanobeams are explored. The results indicate that increasing the nondimensional nonlocal parameter, imposed positive voltage, negative magnetic potential, and temperature rise decreases the critical buckling load and post-buckling load-carrying capacity of METE nanobeams, while an increase in the negative voltage and positive magnetic potential leads to a considerable increase of critical buckling load as well as post-buckling strength of the METE nanobeams.
  • Keywords
    Small-scale effect , Nonlocal elasticity theory , Post-buckling , Magneto-electrothermo- elastic materials , First-order shear deformable nanobeam
  • Journal title
    Astroparticle Physics
  • Serial Year
    2016
  • Record number

    2423790