Title of article
A stabilized nodally integrated tetrahedral
Author/Authors
M. A. Puso، نويسنده , , J. Solberg، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2006
Pages
27
From page
841
To page
867
Abstract
A stabilized, nodally integrated linear tetrahedral is formulated and analysed. It is well known that
linear tetrahedral elements perform poorly in problems with plasticity, nearly incompressible materials,
and acute bending. For a variety of reasons, low-order tetrahedral elements are preferable to quadratic
tetrahedral elements; particularly for nonlinear problems. But the severe locking problems of tetrahedrals
have forced analysts to employ hexahedral formulations for most nonlinear problems. On the other
hand, automatic mesh generation is often not feasible for building many 3D hexahedral meshes.
A stabilized, nodally integrated linear tetrahedral is developed and shown to perform very well
in problems with plasticity, nearly incompressible materials and acute bending. The formulation is
analytically and numerically shown to be stable and optimally convergent for the compressible case
provided sufficient smoothness of the exact solution u ∈C2 ∩ (H1)3. Future work may extend the
formulation to the incompressible regime and relax the regularity requirements; nonetheless, the results
demonstrate that the method is not susceptible to locking and performs quite well in several standard
linear and nonlinear benchmarks.
Keywords
Finite elements , Nodal integration , tetrahedral elements
Journal title
International Journal for Numerical Methods in Engineering
Serial Year
2006
Journal title
International Journal for Numerical Methods in Engineering
Record number
425778
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