hyperoctahedral造句

The representation theory of the hyperoctahedral group was described by according to.
In two dimensions, the hyperoctahedral group structure is the abstract dihedral group of order eight, describing the symmetry of a square, or 2-orthoplex.
Since the symmetric group " S " 2 of degree 2 is isomorphic to $ ! 2 the hyperoctahedral group is a special case of a generalized symmetric group.
The kernels of these three maps are all three index two subgroups of the hyperoctahedral group, as discussed in " H " 1 : Abelianization below, and their intersection is the derived subgroup, of index 4 ( quotient the Klein 4-group ), which corresponds to the rotational symmetries of the demihypercube.
As the hyperoctahedral group of dimension 3 the full octahedral group is the wreath product S _ 2 \ wr S _ 3 \ simeq S _ 2 ^ 3 \ rtimes S _ 3, and a natural way to identify its elements is as pairs ( m, n ) with m \ in [ 0, 3 ! ) and n \ in [ 0, 2 ^ 3 ).
It's difficult to find hyperoctahedral in a sentence. 用hyperoctahedral造句挺难的