• Title of article

    Analysis of hypersingular residual error estimates in boundary element methods for potential problems Original Research Article

  • Author/Authors

    Govind Menon and Subrata Mukherjee، نويسنده , , Glaucio H. Paulino، نويسنده , , Subrata Mukherjee، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 1999
  • Pages
    25
  • From page
    449
  • To page
    473
  • Abstract
    A novel iteration scheme, using boundary integral equations, is developed for error estimation in the boundary element method. The iteration scheme consists of using the boundary integral equation for solving the boundary value problem and iterating this solution with the hypersingular boundary integral equation to obtain a new solution. The hypersingular residual r is consistently defined as the difference in the derivative quantities on the boundary, i.e. image where φ is the potential and (∂φ/∂n)(1), i = 1, 2, is the flux obtained by solution (i). Here, i = 1 refers to the boundary integral equation, and i = 2 refers to the hypersingular boundary integral equation. The hypersingular residual is interpreted in the sense of the iteration scheme defined above and it is shown to provide an error estimate for the boundary value problem. Error-hypersingular residual relations are developed for Dirichlet and Neumann problems, which are shown to be limiting cases of the more general relation for the mixed boundary value problem. These relations lead to global bounds on the error. Four numerical examples, involving Galerkin boundary elements, are given, and one of them involves a physical singularity on the boundary and preliminary adaptive calculations. These examples illustrate important features of the hypersingular residual error estimate proposed in this paper.
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Serial Year
    1999
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Record number

    891575