A posteriori error estimates for continuous/discontinuous Galerkin approximations of the Kirchhoff-Love plate
Journal article, 2011
We present energy norm a posteriori error estimates for continuous/discontinuous Galerkin (c/dG) approximations of the Kirchhoff-Love plate problem. The method is based on a continuous displacement field inserted into a symmetric discontinuous Galerkin formulation of the fourth order partial differential equation governing the deflection of a thin plate. We also give explicit formulas for the penalty parameter involved in the formulation.
Kirchhoff plate
finite-element approximations
Error estimate
elliptic problems
Adaptivity
Discontinuous Galerkin
Author
Peter F G Hansbo
Chalmers, Mathematical Sciences, Mathematics
University of Gothenburg
M. G. Larson
Umeå University
Computer Methods in Applied Mechanics and Engineering
0045-7825 (ISSN)
Vol. 200 47-48 3289-3295Subject Categories
Computational Mathematics
DOI
10.1016/j.cma.2011.07.007