Rheolef
7.2
an efficient C++ finite element environment
|
The edge reference_element
is K = [-1,1]
.
x2 4----------7 |\ |\ | \ | \ | \ | \ | 5------+---6 | | | | 0---+------3 - | ---> x1 \ | \ | \ | \ | \| \| 1----------2 \ x0
The orientation is such that triedra (01, 03, 04) is direct and all faces, see from exterior, are in the direct sens. See
P. L. Georges, Generation automatique de maillages, page 24, coll RMA, 16, Masson, 1994.
This three-dimensional reference_element
is then transformed, after the Piola geometrical application, as a hexahedron in a 3D physical space, as a geo_element
.
Curved high order Pk hexahedra (k >= 1) in 3D geometries are supported. These hexahedra have additional edge-nodes, face-nodes and internal volume-nodes. These nodes are numbered as: first vertex, then edge-node, following the edge numbering order and orientation, then face-nodes following the face numbering order and orientation, and finally the face internal nodes, following the hexahedron lattice.
4----19----7 |\ |\ |16 23 | 18 12 \ 21 15 \ | 5----17+---6 |22 | 26 | 25| 0---+-11---3 | \ 13 24 \ 14 8 | 20 10| \| \| 1-----9----2 P2
Notice that the edge-nodes and face-nodes numbering slightly differ from those used in the gmsh
mesh generator when using high-order elements. This difference is handled by the msh2geo
mesh file converter.
This documentation has been generated from file fem/geo_element/hexahedron.icc