has a 2
n-sided regular skew polygon defined along its side edges. A
regular skew polygon is a faithful symmetric realization of a polygon in dimension greater than 2. In 3 dimensions a regular skew polygon has vertices alternating between two parallel planes. A regular skew -gon can be given a
Schläfli symbol as a
blend of a
regular polygon {{math|} }} and an orthogonal
line segment { }. The symmetry operation between sequential vertices is
glide reflection. Examples are shown on the uniform square and pentagon antiprisms. The
star antiprisms also generate regular skew polygons with different connection order of the top and bottom polygons. The filled top and bottom polygons are drawn for structural clarity, and are not part of the skew polygons.
Petrie polygons are regular skew polygons defined within regular polyhedra and polytopes. For example, the five
Platonic solids have 4-, 6-, and 10-sided regular skew polygons, as seen in these
orthogonal projections with red edges around their respective
projective envelopes. The tetrahedron and the octahedron include all the vertices in their respective zig-zag skew polygons, and can be seen as a digonal antiprism and a triangular antiprism respectively. == Regular skew polygon as vertex figure of regular skew polyhedron ==