• Title of article

    A quadratic programming formulation for the solution of layered elastic contact problems: Example applications and experimental validation

  • Author/Authors

    Reina، نويسنده , , Eduardo A. B. da Silva and Paulo S. R. Dini، نويسنده , , D. and Hills، نويسنده , , D.A. and Iida، نويسنده , , Y.، نويسنده ,

  • Issue Information
    دوماهنامه با شماره پیاپی سال 2011
  • Pages
    12
  • From page
    236
  • To page
    247
  • Abstract
    The development of a quadratic programming formulation for the solution of layered elastic contact problems in the presence of friction is presented in this paper. Conveyor belts, tyred wheels, composite cylinders, and conrod bearings, are classical examples of systems which can be studied using the efficient numerical methodology proposed here. In this type of mechanical assembly, micro-slip between the mating surfaces often occurs and may eventually lead to system failure. Accurately capturing the evolution of slip and stick areas using a computationally inexpensive procedure (as an alternative to full finite element analysis) is therefore key to preventing these failures and to improving the design of various engineering components. oposed approach is first tested and validated against classical marching-in-time solutions for two-dimensional layered systems in the presence of both static and moving loads. Results are then extended to demonstrate the feasibility of the technique to study systems with multiple slip regions and to solve rolling contact problems of practical interest. Finally, the numerical methodology is successfully applied to the prediction of frictional creep of tyred cylinders. Experimental corroboration has been obtained by testing tyred discs.
  • Keywords
    Rolling contact , integral transforms , Frictional creep , Layered systems , quadratic programming
  • Journal title
    European Journal of Mechanics: A Solids
  • Serial Year
    2011
  • Journal title
    European Journal of Mechanics: A Solids
  • Record number

    1402476