• Title of article

    Simulation of local material properties based on moving-window GMC

  • Author/Authors

    Graham ، نويسنده , , L.L. and Baxter، نويسنده , , S.C.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2001
  • Pages
    11
  • From page
    295
  • To page
    305
  • Abstract
    When analyzing the behavior of composite materials under various loading conditions, the assumption is generally made that the behavior due to randomness in the material can be represented by a homogenized, or effective, set of material properties. This assumption may be valid when considering displacement, average strain, or even average stress of structures much larger than the inclusion size. The approach is less valid, however, when considering either behavior of structures of size at the scale of the inclusions or local stress of structures in general. In this paper, Monte Carlo simulation is used to assess the effects of microstructural randomness on the local stress response of composite materials. In order to achieve these stochastic simulations, the mean, variance and spectral density functions describing the randomly varying elastic properties are required as input. These are obtained here by using a technique known as moving-window generalized method of cells (moving-window GMC). This method characterizes a digitized composite material microstructure by developing fields of local effective material properties. Once these fields are generated, it is straightforward to obtain estimates of the associated probabilistic parameters required for simulation. Based on the simulated property fields, a series of local stress fields, associated with the random material sample under uniaxial tension, is calculated using finite element analysis. An estimation of the variability in the local stress response for the given random composite is obtained from consideration of these simulations.
  • Keywords
    stochastic simulation , Micromechanics , microstructure , generalized method of cells , characterization , Material homogenization , Stochastic mechanics
  • Journal title
    Probabilistic Engineering Mechanics
  • Serial Year
    2001
  • Journal title
    Probabilistic Engineering Mechanics
  • Record number

    1567239