• Title of article

    Crack effect on dynamic stability of beams under conservative and nonconservative forces

  • Author/Authors

    Viola، نويسنده , , Erasmo and Marzani، نويسنده , , Alessandro، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2004
  • Pages
    20
  • From page
    699
  • To page
    718
  • Abstract
    The purpose of this paper is to investigate the dynamic stability of beams containing a single crack subjected to conservative and nonconservative forces. verning equation of the system can be derived from the extended Hamilton’s principle in which the kinetic energy, the elastic potential energy, the conservative work and the nonconservative work must be taken into account. cal flexibility matrix of a beam of a rectangular cross-section with a single edge crack is employed in order to perform numerical analysis. vestigated cracked beams are subjected to triangularly distributed subtangential forces, which are the combination of axial and tangential forces. udied cracked beams become unstable in the form of either flutter or divergence, depending on crack parameters and on the degree of nonconservativeness of the load, when boundary conditions are fixed.
  • Keywords
    Nonconservative forces , Fracture mechanics , Beam , Crack modelling , Finite elements , Dynamic stability
  • Journal title
    ENGINEERING FRACTURE MECHANICS
  • Serial Year
    2004
  • Journal title
    ENGINEERING FRACTURE MECHANICS
  • Record number

    2340663