TY - JOUR
T1 - Numerical homogenization for incompressible materials using selective smoothed finite element method
AU - Li, Eric
AU - Zhang, Zhongpu
AU - Chang, C. C.
AU - Liu, G. R.
AU - Li, Q.
PY - 2015
Y1 - 2015
N2 - Composite materials with periodic microstructures are commonly used in engineering. Numerical homogenization with finite element method (FEM) has proven fairly effective to determine the mechanical properties of a range of composite materials. However, traditional FEM fails to evaluate the effective mechanical properties for incompressible constituents due to volumetric locking problem in numerical analysis. In this paper, a novel selective smoothed finite element method (S-FEM) in multi-material domain using triangular and tetrahedral elements is proposed to overcome the locking problem in the numerical homogenization of incompressible materials. The implementation of S-FEM is easy without additional parameters. A number of characterization examples for porous, multiphase, tissue scaffold composites are presented to demonstrate the effectiveness of the proposed SFEM homogenization in handling incompressible base materials.
AB - Composite materials with periodic microstructures are commonly used in engineering. Numerical homogenization with finite element method (FEM) has proven fairly effective to determine the mechanical properties of a range of composite materials. However, traditional FEM fails to evaluate the effective mechanical properties for incompressible constituents due to volumetric locking problem in numerical analysis. In this paper, a novel selective smoothed finite element method (S-FEM) in multi-material domain using triangular and tetrahedral elements is proposed to overcome the locking problem in the numerical homogenization of incompressible materials. The implementation of S-FEM is easy without additional parameters. A number of characterization examples for porous, multiphase, tissue scaffold composites are presented to demonstrate the effectiveness of the proposed SFEM homogenization in handling incompressible base materials.
KW - composite materials
KW - finite element method
KW - homogenization (differential equations)
UR - http://handle.westernsydney.edu.au:8081/1959.7/uws:48849
U2 - 10.1016/j.compstruct.2014.12.016
DO - 10.1016/j.compstruct.2014.12.016
M3 - Article
SN - 0263-8223
VL - 123
SP - 216
EP - 232
JO - Composite Structures
JF - Composite Structures
ER -