7. E modeling#

7.1. Characteristics of modeling#

3D modeling is used with element type TETRA4 and the LAC contact processing method.

7.2. Characteristics of the mesh#

A convergence study is carried out with the fineness of the mesh from the calculated solution to the analytical solution. A series of meshes obtained by uniform refinement using the MACR_ADAP_MAIL command is used:

mesh 0:16 elements of type TRIA3 and 10 elements of type TETRA4
mesh 1:64 elements of type TRIA3 and 64 elements of type TETRA4
mesh 2:256 elements of type TRIA3 and 448 elements of type TETRA4
mesh 3:1024 elements of type TRIA3 and 3328 elements of type TETRA4
mesh 4:4096 elements of type TRIA3et 25600 element of type TETRA4

The curved \(\text{MAITRE}\) surface is meshed with a unique QUAD8.

7.3. Tested sizes and results#

The convergence speed is tested with the fineness of the mesh from the calculated solution to the analytical solution in standard \({L}_{2}\):

the largest real \({\alpha }_{U}>0\) such as \({\mathrm{\parallel }{\underline{U}}^{\text{calc}}\mathrm{-}{\underline{U}}^{\text{ref}}\mathrm{\parallel }}_{\mathrm{0,}\Omega }<{C}_{U}\mathrm{\times }{h}^{{\alpha }_{U}}\) where \({C}_{U}\) is independent of \(h\) for displacement;
the largest real \({\mathrm{\alpha }}_{p}>0\) such as \({\Vert {p}^{\text{calc}}-{p}^{\text{ref}}\Vert }_{0,{\mathrm{\Gamma }}_{C}}<{C}_{p}\times {h}^{{\mathrm{\alpha }}_{p}}\) where \({C}_{p}\) is independent of \(h\) for contact pressure.

Identification	Reference type	Reference value
\({\mathrm{\alpha }}_{U}\)	“ANALYTIQUE”	2.0

\({\mathrm{\alpha }}_{p}\)

“ANALYTIQUE”

0.5