Symmetric Galerkin boundary element method.

Abstract : This review concerns a methodology for solving numerically, to engineering purposes, boundary and initial-boundary value roblems by a peculiar approach characterized by the following features: the continuous formulation is centered on integral equations based on the combined use of single-layer and double-layer sources, so that the integral operator turns out to be symmetric with respect to a suitable bilinear form; the discretization is performed either on a variational basis or by a Galerkin weighted residual procedure, the interpolation and weight functions being chosen so that the variables in the approximate formulation are generalized variables in Prager's sense. As main consequences of the above provisions, symmetry is exhibited by matrices with a key role in the algebraized versions, some quadratic forms have a clear energy meaning, variational properties characterize the solutions and other results, invalid in traditional boundary element methods, enrich the theory underlying the computational applications. The present survey outlines recent theoretical and computational developments of the title methodology with particular reference to linear elasticity, elastoplasticity, fracture mechanics, time-dependent problems, variational approaches, singular integrals, approximation issues, sensitivity analysis, coupling of boundary and finite elements, computer implementations. Areas and aspects which at present require further research are dentified and comparative assessments are attempted with respect to traditional boundary integral-element methods.
Complete list of metadatas

Cited literature [124 references]  Display  Hide  Download

https://hal.archives-ouvertes.fr/hal-00111259
Contributor : Marc Bonnet <>
Submitted on : Monday, August 11, 2008 - 2:34:25 PM
Last modification on : Tuesday, August 13, 2019 - 11:10:03 AM
Long-term archiving on : Tuesday, April 6, 2010 - 9:32:28 PM

Files

amrfinal.pdf
Files produced by the author(s)

Identifiers

  • HAL Id : hal-00111259, version 1

Citation

Marc Bonnet, G. Maier, C. Polizzotto. Symmetric Galerkin boundary element method.. Appl. Mech. Rev., 1998, 51, pp.669-704. ⟨hal-00111259⟩

Share

Metrics

Record views

525

Files downloads

1948