Hexagonal duoprismatic symmetry

Hexagonal duoprismatic symmetry, notated as G2≀S2, is a 4D spherical symmetry group. It is the symmetry group of the hexagonal duoprism and hexagonal duotegum.

Convex polytopes with G2≀S2 symmetry

 * Hexagonal duoprism (noble)/Hexagonal duotegum (noble)
 * Rectified hexagonal duoprism (isogonal)/Joined hexagonal duoprism (isotopic)
 * Truncated hexagonal duoprism (isogonal)/Tetrakis hexagonal duotegum (isotopic)
 * Dihexagonal duoprism (isogonal)/Hexambic duotegum (isotopic)
 * Dihexagonal duotegum (isogonal)/Hexambic duoprism (isotopic)
 * Hexagonal ditetragoltriate (isogonal)/Hexagonal tetrambitriate (isotopic)
 * Dihexagonal ditetragoltriate (isogonal)/Hexambic tetrambitriate (isotopic)
 * Hexagonal antiditetragoltriate (isogonal)/Hexagonal antitetrambitriate (isotopic)
 * Hexagonal duoexpandoprism (isogonal)/Hexagonal duoexpandotegum (isotopic)
 * Hexagonal duotruncatoprism (isogonal)/Hexagonal duotruncatotegum (isotopic)
 * Hexagonal duoantifrustoprism (isogonal)/Hexagonal duoantifrustotegum (isotopic)
 * Hexagonal duotruncatoalterprism (isogonal)/Hexagonal duotruncatoaltertegum (isotopic)
 * Hexagonal duotransitionalterprism (isogonal)/Hexagonal duotransitionaltertegum (isotopic)
 * Hexagonal truncatoprismantifrustoid (isogonal)/Hexagonal apiculatotegmocrystalloid (isotopic)
 * Dihexagonal duotransitionalterprism (isogonal)/Hexambic duotransitionaltertegum (isotopic)