• Title of article

    Solving elliptic boundary value problems with uncertain coefficients by the finite element method: the stochastic formulation Original Research Article

  • Author/Authors

    Ivo Babuska، نويسنده , , Raul Tempone، نويسنده , , Georgios E. Zouraris، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2005
  • Pages
    44
  • From page
    1251
  • To page
    1294
  • Abstract
    This work studies a linear elliptic problem with uncertainty. The introduction gives a survey of different formulations of the uncertainty and resulting numerical approximations. The major emphasis of this work is the probabilistic treatment of uncertainty, addressing the problem of solving linear elliptic boundary value problems with stochastic coefficients. If the stochastic coefficients are known functions of a random vector, then the stochastic elliptic boundary value problem is turned into a parametric deterministic one with solution u(y, x), y ∈ Γ, x ∈ D, where image, d = 1, 2, 3, and Γ is a high-dimensional cube. In addition, the function u is specified as the solution of a deterministic variational problem over Γ × D. A tensor product finite element method, of h-version in D and k-, or, p-version in Γ, is proposed for the approximation of u. A priori error estimates are given and an adaptive algorithm is also proposed. Due to the high dimension of Γ, the Monte Carlo finite element method is also studied here. This work compares the asymptotic complexity of the numerical methods, and shows results from numerical experiments. Comments on the uncertainty in the probabilistic characterization of the coefficients in the stochastic formulation are included.
  • Keywords
    Stochastic elliptic equation , Finite elements , Perturbation estimates , Karhunen–Loève expansion , Monte Carlo method , k × h-version , p × h-version , Expected value , Adaptive methods , error control , Error estimates
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Serial Year
    2005
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Record number

    893217