Hexadecachoron

The hexadecachoron, or hex, also commonly called the 16-cell, is one of the 6 convex regular polychora. It has 16 regular tetrahedra as cells, joining 4 to an edge and 8 to a vertex in an octahedral arrangement. It is the 4-dimensional orthoplex.

It is also the square duotegum, the digonal duoantiprism, the digonal diswirlprism, and the 8-3 step prism. Together with its dual, the hexadecachoron is the first in a series of tetrahedral and digonal antiprismatic swirlchora and the first in a series of square dihedral swirlchora. It can also be seen as a tetrahedral antiprism in two senses, being both a segmentochoron of a tetrahedron atop dual tetrahedron (being designated K-4.2 in Richard Klitzing's list of convex segmentochora) and the alternated cubic prism (that is a tesseract). It is also a regular-faced octahedral bipyramid.

It and the great duoantiprism are the only uniform duoantiprisms, and it is the only one that is convex and regular.

It is one of the three regular polychora that can tile 4D space, the others being the tesseract and the icositetrachoron.

The hex company also contains the tesseractihemioctachoron.

Vertex coordinates
The vertices of a regular hexadecachoron of edge length 1, centered at the origin, are given by all permutations of:
 * (±$\sqrt{2}$/2, 0, 0, 0).

They can also be given as the even changes of sign of:


 * ($\sqrt{2}$/4, $\sqrt{2}$/4, $\sqrt{2}$/4, $\sqrt{2}$/4).

These are formed by alternating the vertices of a tesseract.

Demitesseract
The hexadecachoron can also be constructed as the alternation of the tesseract. In this variation, called a demitesseract and having D4 symmetry, the tetrahedral cells come in 2 groups of 8, with all cells in one group sharing faces only with those of the other group. This makes it the 4-dimensional demihypercube. It can be represented as x3o3o *b3o.

Isogonal derivatives
Substitution by vertices of these following elements will produce these convex isogonal polychora:
 * Tetrahedron (16): Tesseract
 * Triangle (32): Rectified tesseract
 * Edge (24): Icositetrachoron

Representations
A hexadecachoron has the following Coxeter diagrams:


 * o4o3o3x (full symmetry)
 * x3o3o *b3o (D4 symmetry, as demitesseract)
 * s4o3o3o (as alternated tesseract)
 * s2s4o3o (as tetrahedral antiprism/alternated cubic prism)
 * s4o2s4o (as digonal duoantiprism)
 * s2s2s4o (as disphenoidal antiprism)
 * s2s2s2s (as alternated 4D block)
 * xo3oo3ox&#x (A3 axial, tetrahedron atop dual tetrahedron)
 * ooo4ooo3oxo&#xt (BC3 axial, as octahedral bipyramid)
 * ooo3oxo3ooo&#xt (A3 axial, as tetratetrahedral bipyramid)
 * o(qo)o o(ox)o4o(oo)o&#xt (as square bipyramidal bipyramid)
 * o(qoo)o o(oqo)o o(ooq)o&#xt (as rhombic bipyramidal bipyramid)
 * xox oxo4ooo&#xt (BC2×A1 axial, edge-first)
 * xox oxo oxo&#xt (A1×A1 axial, edge-first)
 * xoo3oox oqo&#xt (A2×A1 axial, face-first)
 * oxoo3ooox&#xr (A2 axial)
 * xo4oo ox4oo&#zx (BC2×BC2 symmetry, as square duotegum)
 * xo xo ox4oo&#zx (as square-rectangular duotegum)
 * xo xo ox ox&#zx (as rectangular duotegum)
 * xoxo oxox&#xr (A1×A1 axial)
 * qo oo4oo3ox&#zx (BC2×A1 symmetry)
 * qo oo3ox3oo&#zx (A3×A1 symmetry)
 * qo os2os3os&#zx (as triangular antiprismatic bipyramid)
 * qooo oqoo ooqo oooq&#zx (A1×A1×A1×A1 symmetry)
 * qoo oqo oox4ooo&#zx (BC2×A1×A1 symmetry)

Related polychora
The hexadecachoron is the colonel of a two-member regiment that includes the tesseractihemioctachoron

A hexadecachoron can be cut in half to produce 2octahedral pyramids.