Swirlchoron

A swirlchoron is a polychoron that expresses the Hopf fibration of a given polyhedron. In other words, the vertices or cells of a polychoron map to a ring of swirling great circles within a glome that represents a face of a polytwister, and are therefore their polychoric approximations. For every regular spherical polyhedron (including degenerate dihedra/hosohedra), a swirlchoron can be constructed. Their vertices can be compounded to form new swirlchora, an example being the difold ditetraswirlchoron, being the compound of two hexadecachora in tetrahedral swirlprism symmetry, or the tri-icositetradiminished hexacosichoron, being the tetragonal-antiwedge compound of two icositetrachora in cubic swirlprism symmetry.

Swirlchora can be isogonal or isochoric. Some swirlchora, such as the bi-icositetradiminished hexacosichoron and its dual, the tri-icositetradiminished hexacosichoron, are both isogonal and isochoric, and are therefore noble.

Tetrahedron-based isogonal swirlprisms
Coordinates for the vertices of a 2n-fold tetraswirlchoron of circumradius 1, centered at the origin, are given by: along with 120° and 240° rotations in the xy axis of: where k is an integer from 0 to n-1.
 * ±(0, 0, sin(kπ/n), cos(kπ/n)),
 * ±($\sqrt{6}$sin(kπ/n)/3, $\sqrt{6}$cos(kπ/n)/3, $\sqrt{3}$cos(kπ/n)/3, $\sqrt{3}$sin(kπ/n)/3),

Cube-based isogonal swirlprisms
Coordinates for the vertices of a 12n-fold cubiswirlchoron of circumradius 1, centered at the origin, are given by, along with their 90°, 180° and 270° rotations in the xy axis of: where k is an integer from 0 to 6n-1.
 * ±(sin(kπ/6n)/$\sqrt{3+√3}$, cos(kπ/6n)/$\sqrt{3+√3}$, cos(kπ/6n)/$\sqrt{3-√3}$, sin(kπ/6n)/$\sqrt{3-√3}$),
 * ±(sin((k+n/2)π/6n)/$\sqrt{3-√3}$, cos((k+n/2)π/6n)/$\sqrt{3-√3}$, cos((k+n/2)π/6n)/$\sqrt{3+√3}$, sin((kn1/2)π/6n)/$\sqrt{3+√3}$),

Octahedron-based isogonal swirlprisms
Coordinates for the vertices of a 4n-fold octaswirlchoron of circumradius 1, centered at the origin, are given by: along with 90°, 180° and 270° rotations in the xy axis of: where k is an integer from 0 to 2n-1.
 * ±(0, 0, sin(kπ/2n), cos(kπ/2n)),
 * ±(sin(kπ/2n), cos(kπ/2n), 0, 0),
 * ±(sin((k+n/2)π/2n)/$\sqrt{2}$, cos((k+n/2)π/2n)/$\sqrt{2}$, cos((k+n/2)π/2n)/$\sqrt{2}$, sin((k+n/2)π/2n)/$\sqrt{2}$),

Cuboctahedron-based isogonal swirlprisms
Coordinates for the vertices of an 8n-fold cuboctaswirlchoron of circumradius 1, centered at the origin, are given by, along with their 90°, 180° and 270° rotations in the xy axis of: where k is an integer from 0 to 4n-1.
 * ±(sin(kπ/4n)/$\sqrt{4+2√2}$, cos(kπ/4n)/$\sqrt{4+2√2}$, cos(kπ/4n)/$\sqrt{4-2√2}$, sin(kπ/4n)/$\sqrt{4-2√2}$),
 * ±(sin(kπ/4n)/$\sqrt{4-2√2}$, cos(kπ/4n)/$\sqrt{4-2√2}$, cos(kπ/4n)/$\sqrt{4+2√2}$, sin(kπ/4n)/$\sqrt{4+2√2}$),
 * ±(sin((2k+n)π/8n)/$\sqrt{2}$, cos((2k+n)π/8n)/$\sqrt{2}$, cos((2k-n)π/8n)/$\sqrt{2}$, sin((2k-n)π/8n)/$\sqrt{2}$),

Chiral cuboctahedron-based isogonal swirlprisms
Coordinates for the vertices of a chiro-(8n-4)-fold cuboctaswirlchoron of circumradius 1, centered at the origin, are given by, along with their 180° rotations in the xy axis of: where k is an integer from 0 to 4n-3.
 * ±(sin(kπ/(4n-2))/$\sqrt{4+2√2}$, cos(kπ/(4n-2))/$\sqrt{4+2√2}$, cos(kπ/(4n-2))/$\sqrt{4-2√2}$, sin(kπ/(4n-2))/$\sqrt{4-2√2}$),
 * ±(sin(kπ/(4n-2))/$\sqrt{4-2√2}$, cos(kπ/(4n-2))/$\sqrt{4-2√2}$, cos(kπ/(4n-2))/$\sqrt{4+2√2}$, sin(kπ/(4n-2))/$\sqrt{4+2√2}$),
 * ±(cos((2k-1)π/(8n-4))/$\sqrt{4+2√2}$, -sin((2k-1)π/(8n-4))/$\sqrt{4+2√2}$, cos((2k-1)π/(8n-4))/$\sqrt{4-2√2}$, sin((2k-1)π/(8n-4))/$\sqrt{4-2√2}$),
 * ±(cos((2k-1)π/(8n-4))/$\sqrt{4-2√2}$, -sin((2k-1)π/(8n-4))/$\sqrt{4-2√2}$, cos((2k-1)π/(8n-4))/$\sqrt{4+2√2}$, sin((2k-1)π/(8n-4))/$\sqrt{4+2√2}$),
 * ±(sin((4k+2n+1)π/(16n-8))/$\sqrt{2}$, cos((4k+2n+1)π/(16n-8))/$\sqrt{2}$, cos((4k+2n+3)π/(16n-8))/$\sqrt{2}$, sin((4k+2n+3)π/(16n-8))/$\sqrt{2}$),
 * ±(cos((4k+2n-1)π/(16n-8))/$\sqrt{2}$, -sin((4k+2n-1)π/(16n-8))/$\sqrt{2}$, cos((4k+2n+1)π/(16n-8))/$\sqrt{2}$, sin((4k+2n+1)π/(16n-8))/$\sqrt{2}$),

Dodecahedron-based isogonal swirlprisms
Coordinates for the vertices of a 30n-fold dodecaswirlchoron of circumradius 1, centered at the origin, are given by, along with 72°, 144°, 216° and 288° rotations in the xy axis of: where c1 = $\sqrt{450-30√75+30√5}$/30, c2 = $\sqrt{450+30√75+30√5}$/30, c3 = $\sqrt{450-30√75-30√5}$/30, c4 = $\sqrt{450+30√75-30√5}$/30 and k is an integer from 0 to 15n-1.
 * ±(c1*sin(kπ/15n), c1*cos(kπ/15n), c2*cos(kπ/15n), c2*sin(kπ/15n)),
 * ±(c2*sin(kπ/15n), c2*cos(kπ/15n), -c1*cos(kπ/15n), -c1*sin(kπ/15n)),
 * ±(c3*sin((k+n/2)π/15n), c3*cos((k+n/2)π/15n), c4*cos((k+n/2)π/15n), c4*sin((k+n/2)π/15n)),
 * ±(c4*sin((k+n/2)π/15n), c4*cos((k+n/2)π/15n), -c3*cos((k+n/2)π/15n), -c3*sin((k+n/2)π/15n)),

Icosahedron-based isogonal swirlprisms
Coordinates for the vertices of a 10n-fold icosaswirlchoron of circumradius 1, centered at the origin, are given by: along with 72°, 144°, 216° and 288° rotations in the xy axis of: where k is an integer from 0 to 5n-1.
 * ±(0, 0, sin(kπ/5n), cos(kπ/5n)),
 * ±(cos(kπ/5n), sin(kπ/5n), 0, 0),
 * ±(2sin(kπ/5n)/$\sqrt{10+2√5}$, 2cos(kπ/5n)/$\sqrt{10+2√5}$, 2cos(kπ/5n)/$\sqrt{10-2√5}$, 2sin(kπ/5n)/$\sqrt{10-2√5}$),
 * ±(2sin(kπ/5n)/$\sqrt{10-2√5}$, 2cos(kπ/5n)/$\sqrt{10-2√5}$, -2cos(kπ/5n)/$\sqrt{10+2√5}$, -2sin(kπ/5n)/$\sqrt{10+2√5}$),

Dihedral-based isogonal swirlprisms
Coordinates for the vertices of a m*n-fold dihedroswirlchoron of circumradius 1, centered at the origin, are given by, along with their m-fold rotations in the xy axis of:
 * (sin(k2π/mn)/$\sqrt{2}$, cos(k2π/mn)/$\sqrt{2}$, cos(k2π/mn)/$\sqrt{2}$, sin(k2π/mn)/$\sqrt{2}$),

Prismatic-based isogonal swirlprisms
Coordinates for the vertices of an m*n-fold m-gonal prismatoswirlchoron of circumradius 1, centered at the origin, are given by, along with their m-fold rotations in the xy axis of: where a is less than 1, b is equivalent to $\sqrt{1-a^{2}}$ and k is an integer from 0 to n-1.
 * (a*sin(k2π/mn), a*cos(k2π/mn), b*cos(k2π/mn), b*sin(k2π/mn)),
 * (b*sin(k2π/mn), b*cos(k2π/mn), a*cos(k2π/mn), a*sin(k2π/mn)),

Antiprismatic-based isogonal swirlprisms
Coordinates for the vertices of an m*n-fold m-gonal antiprismatoswirlchoron of circumradius 1, centered at the origin, are given by, along with their m-fold rotations in the xy axis of: where a is less than 1, b is equivalent to $\sqrt{1-a^{2}}$ and k is an integer from 0 to n-1.
 * (a*sin(k2π/mn), a*cos(k2π/mn), b*cos(k2π/mn), b*sin(k2π/mn)),
 * (b*sin(k2π/mn), b*cos(k2π/mn), -a*cos(k2π/mn), -a*sin(k2π/mn)),

Tetrahedron-based
1. Hexadecachoron (8 vertices, octahedron vertex figure) - tesseract (16 cubes)

2. Tetrafold tetraswirlchoron (16 vertices, triakis triangular bipyramid vertex figure) - tetraswirlic hexadecachoron or tetswirl 16 (16 truncated triangular prisms)

3. Icositetrachoron (24 vertices, cube vertex figure) - dual icositetrahedron (24 octahedra)

4. Octafold tetraswirlchoron (32 vertices, vertical-bisected joined triangular prism vertex figure) - tetraswirlic triacontadichoron or tetswirl 32 (96 edge-alternate laterostellated hexagonal prisms)

5. Decafold tetraswirlchoron (40 vertices, alternate-metatriakis hexagonal bipyramid vertex figure) - tetraswirlic tetracontachoron or tetswirl 40 (40 alternate-metatruncated hexagonal prisms)

6. Dodecafold tetraswirlchoron (48 vertices, edge-vertical bisected trigonal trapezohedron vertex figure) - tetraswirlic tetracontoctachoron or tetswirl 48 (48 rhombistellated hexagonal antiprisms)

7. Tetradecafold tetraswirlchoron (56 vertices) - tetraswirlic pentacontahexachoron or tetswirl 56 (56 cells)

8. Hexadecafold tetraswirlchoron (64 vertices) - tetraswirlic hexacontatetrachoron or tetswirl 64 (64 cells)

9. Octadecafold tetraswirlchoron (72 vertices) - tetraswirlic heptacontadichoron or tetswirl 72 (72 cells)

10. Icosafold tetraswirlchoron (80 vertices) - tetraswirlic octacontachoron or tetswirl 80 (80 cells)

Small rhombitetratetrahedron-based
1. Small tetrafold rhombitetraswirlchoron (48 vertices) - deltododecaswirlic tetracontoctachoron (48 cells)

2. Small dodecafold rhombitetraswirlchoron (144 vertices) - deltododecaswirlic hecatontetracontatetrachoron (144 cells)

3. Small icosafold rhombitetraswirlchoron (240 vertices) - deltododecaswirlic diacositetracontachoron (240 cells)

4. Small icosioctafold rhombitetraswirlchoron (336 vertices) - deltododecaswirlic triacositriacontahexachoron (336 cells)

5. Small triacontahexafold rhombitetraswirlchoron (432 vertices) - deltododecaswirlic tetracositriacontadichoron (432 cells)

6. Small tetracontatetrafold rhombitetraswirlchoron (528 vertices) - deltododecaswirlic pentacosicosoctachoron (528 cells)

7. Small pentacontadifold rhombitetraswirlchoron (624 vertices) - deltododecaswirlic hexacosicositetrachoron (624 cells)

8. Small hexecontafold rhombitetraswirlchoron (720 vertices) - deltododecaswirlic heptacosiicosachoron (720 cells)

9. Small hexacontoctafold rhombitetraswirlchoron (816 vertices) - deltododecaswirlic octacosihexadecachoron (816 cells)

10. Small heptacontahexafold rhombitetraswirlchoron (912 vertices) - deltododecaswirlic enneacosidodecachoron (912 cells)

Cube-based
1. Square-antiprismatic heptacontadichoron (96 vertices, trigonal trapezohedron vertex figure) - triangular-antiprismatic enneacontahexachoron (96 triangular antiprisms)

2. Icositetrafold cubiswirlchoron (192 vertices, edge-vertical bisected trigonal trapezohedron vertex figure) - octaswirlic hecatonenneacontadichoron or octswirl 192 (192 rhombistellated hexagonal antiprisms)

3. Triacontahexafold cubiswirlchoron (288 vertices) - octaswirlic diacosioctacontoctachoron or octswirl 288 (288 cells)

4. Tetracontoctafold cubiswirlchoron (384 vertices) - octaswirlic triacosioctacontatetrachoron or octswirl 384 (384 cells)

5. Hexecontafold cubiswirlchoron (480 vertices) - octaswirlic tetracosioctacontachoron or octswirl 480 (480 cells)

6. Heptacontadifold cubiswirlchoron (576 vertices) - octaswirlic pentacosiheptacontahexachoron or octswirl 576 (576 cells)

7. Octacontatetrafold cubiswirlchoron (672 vertices) - octaswirlic hexacosiheptacontadichoron or octswirl 672 (672 cells)

8. Enneacontahexafold cubiswirlchoron (768 vertices) - octaswirlic heptacosihexacontoctachoron or octswirl 768 (768 cells)

9. Hecatonoctafold cubiswirlchoron (864 vertices) - octaswirlic octacosihexacontatetrachoron or octswirl 864 (864 cells)

10. Hecatonicosafold cubiswirlchoron (960 vertices) - octaswirlic enneacosihexecontachoron or octswirl 960 (960 cells)

Octahedron-based
1. Icositetrachoron (24 vertices, cube vertex figure) - dual icositetrahedron (24 octahedra)

2. Bitetracontoctachoron (48 vertices, triakis octahedron vertex figure) - tetracontoctachoron (48 truncated cubes)

3. Triangular-antiprismatic enneacontahexachoron or octswirl 96 (72 vertices, tetragonal trapezohedron vertex figure) - square-antiprismatic heptacontadichoron or cubeswirl 72 (72 square antiprisms)

4. Hexadecafold octaswirlchoron (96 vertices, bisected rhombic dodecahedron vertex figure) - cubiswirlic enneacontahexachoron or cubeswirl 96 (96 edge-alternate laterostellated octagonal prisms)

5. Icosafold octaswirlchoron (120 vertices, alternate-metatriakis octagonal bipyramid vertex figure) - cubiswirlic hecatonicosachoron or cubeswirl 120 (120 alternate-metatruncated octagonal prisms)

6. Icositetrafold octaswirlchoron (144 vertices, edge-vertical bisected tetragonal trapezohedron vertex figure) - cubiswirlic hecatontetracontatetrachoron or cubeswirl 144 (144 rhombistellated octagonal antiprisms)

7. Icosioctafold octaswirlchoron (168 vertices) - cubiswirlic hecatonhexacontaoctachoron or cubeswirl 168 (168 cells)

8. Triacontadifold octaswirlchoron (192 vertices) - cubiswirlic hecatonenneacontadichoron or cubeswirl 192 (192 cells)

9. Triacontahexafold octaswirlchoron (216 vertices) - cubiswirlic diacosihexadecachoron or cubeswirl 216 (216 cells)

10. Tetracontafold octaswirlchoron (240 vertices) - cubiswirlic diacositetracontachoron or cubeswirl 240 (240 cells)

Cuboctahedron-based
1. Octafold cuboctaswirlchoron (96 vertices) - rhombidodecaswirlic enneacontahexachoron (96 cells)

2. Hexadecafold cuboctaswirlchoron (192 vertices) - rhombidodecaswirlic hecatonennacontadichoron (192 cells)

3. Icositetrafold cuboctaswirlchoron (288 vertices, rectangular trapezohedron vertex figure) - rhombidodecaswirlic diacosioctacontoctachoron (288 rhombic antiprism cells)

4. Triacontadifold cuboctaswirlchoron (384 vertices) - - rhombidodecaswirlic triacosioctacontatetrachoron (384 cells)

5. Tetracontafold cuboctaswirlchoron (480 vertices) - rhombidodecaswirlic tetracosioctacontachoron (480 cells)

6. Tetracontoctafold cuboctaswirlchoron (576 vertices) - rhombidodecaswirlic pentacosiheptacontahexachoron (576 cells)

7. Pentacontahexafold cuboctaswirlchoron (672 vertices) - rhombidodecaswirlic hexacosiheptacontadichoron (672 cells)

8. Hexacontatetrafold cuboctaswirlchoron (768 vertices) - rhombidodecaswirlic heptacosihexacontoctachoron (768 cells)

9. Heptacontadifold cuboctaswirlchoron (864 vertices) - rhombidodecaswirlic octacosihexacontatetrachoron (864 cells)

10. Octacontafold cuboctaswirlchoron (960 vertices) - rhombidodecaswirlic enneacosihexecontachoron (960 cells)

Chiral cuboctahedron-based
1. Bitetracontoctachoron (48 vertices, triakis octahedron vertex figure) - tetracontoctachoron (48 truncated cubes)

2. Chirododecafold cuboctaswirlchoron (144 vertices) - chirorhombidodecaswirlic hecatontetracontatetrachoron (144 cells)

3. Chiroicosafold cuboctaswirlchoron (240 vertices) - chirorhombidodecaswirlic diacositetracontachoron (240 cells)

4. Chiroicosioctafold cuboctaswirlchoron (336 vertices) - chirorhombidodecaswirlic triacositriacontahexachoron (336 cells)

5. Chirotriacontahexafold cuboctaswirlchoron (432 vertices) - chirorhombidodecaswirlic tetracositriacontadichoron (432 cells)

6. Chirotetracontatetrafold cuboctaswirlchoron (528 vertices) - chirorhombidodecaswirlic pentacosicosoctachoron (528 cells)

7. Chiropentacontadifold cuboctaswirlchoron (624 vertices) - chirorhombidodecaswirlic hexacosicositetrachoron (624 cells)

8. Chirohexecontafold cuboctaswirlchoron (720 vertices) - chirorhombidodecaswirlic heptacosiicosachoron (720 cells)

9. Chirohexacontoctafold cuboctaswirlchoron (816 vertices) - chirorhombidodecaswirlic octacosihexadecachoron (816 cells)

10. Chiroheptacontahexafold cuboctaswirlchoron (912 vertices) - chirorhombidodecaswirlic enneacosidodecachoron (912 cells)

Dodecahedron-based
1. Pentagonal-antiprismatic triacosihexecontachoron (600 vertices, trigonal trapezohedron vertex figure) - triangular-antiprismatic hexacosichoron (600 triangular antiprisms)

2. Hexecontafold dodecaswirlchoron (1200 vertices, edge-vertical bisected trigonal trapezohedron vertex figure) - icosaswirlic chilliadiacosichoron or ikeswirl 1200 (1200 rhombistellated hexagonal antiprisms)

3. Enneacontafold dodecaswirlchoron (1800 vertices) - icosaswirlic chilliaoctacosichoron or ikeswirl 1800 (1800 cells)

4. Hecatonicosafold dodecaswirlchoron (2400 vertices) - icosaswirlic dischilliatetracosichoron or ikeswirl 2400 (2400 cells)

5. Hecatonpentacontafold dodecaswirlchoron (3000 vertices) - icosaswirlic trischilliachoron or ikeswirl 3000 (3000 cells)

6. Hecatonoctacontafold dodecaswirlchoron (3600 vertices) - icosaswirlic trischilliahexacosichoron or ikeswirl 3600 (3600 cells)

7. Diacosidecafold dodecaswirlchoron (4200 vertices) - icosaswirlic tetrachilliadiacosichoron or ikeswirl 4200 (4200 cells)

8. Diacositetracontafold dodecaswirlchoron (4800 vertices) - icosaswirlic tetrachilliaoctacosichoron or ikeswirl 4800 (4800 cells)

9. Diacosiheptacontafold dodecaswirlchoron (5400 vertices) - icosaswirlic pentachilliatetracosichoron or ikeswirl 5400 (5400 cells)

10. Triacosifold dodecaswirlchoron (6000 vertices) - icosaswirlic hexachilliachoron or ikeswirl 6000 (6000 cells)

Icosahedron-based
1. Hexacosichoron (120 vertices, icosahedron vertex figure) - hecatonicosachoron (120 dodecahedra)

2. Icosafold icosaswirlchoron (240 vertices, triakis pentagonal bipyramid vertex figure) - dodecaswirlic diacositetracontachoron or doeswirl 240 (240 truncated pentagonal prisms)

3. Triangular-antiprismatic hexacosichoron or ikeswirl 600 (360 vertices, pentagonal trapezohedron vertex figure) - pentagonal-antiprismatic triacosihexecontachoron or doeswirl 360 (360 pentagonal antiprisms)

4. Tetracontafold icosaswirlchoron (480 vertices, vertical-bisected joined pentagonal prism vertex figure) - dodecaswirlic tetracosioctacontachoron or doeswirl 480 (480 edge-alternate laterostellated decagonal prisms)

5. Pentacontafold icosaswirlchoron (600 vertices, alternate-metatriakis decagonal bipyramid vertex figure) - dodecaswirlic hexacosichoron or doeswirl 600 (600 alternate-metatruncated decagonal prisms)

6. Hexecontafold icosaswirlchoron (720 vertices, edge-vertical bisected pentagonal trapezohedron vertex figure) - dodecaswirlic heptacosiicosachoron or doeswirl 720 (720 rhombistellated decagonal antiprisms)

7. Heptacontafold icosaswirlchoron (840 vertices) - dodecaswirlic octacositetracontachoron or doeswirl 840 (840 cells)

8. Octacontafold icosaswirlchoron (960 vertices) - dodecaswirlic enneacosihexecontachoron or doeswirl 960 (960 cells)

9. Enneacontafold icosaswirlchoron (1080 vertices) - dodecaswirlic chilliaoctacontachoron or doeswirl 1080 (1080 cells)

10. Hectofold icosaswirlchoron (1200 vertices) - dodecaswirlic chilliadiacosichoron or doeswirl 1200 (1200 cells)

Icosidodecahedron-based
1. Hexacosichoron (120 vertices, icosahedron vertex figure) - hecatonicosachoron (120 dodecahedra)

2. Bitetrahedral diacositetracontachoron (240 vertices, chiral ditriakis tetrahedron vertex figure) - ditruncated-tetrahedral diacositetracontachoron (240 chiral ditruncated tetrahedra)

3. Dodecafold icosidodecaswirlchoron (360 vertices) - rhombitriacontaswirlic triacosihexecontachoron (360 cells)

4. Hexadecafold icosidodecaswirlchoron (480 vertices) - - rhombitriacontaswirlic tetracosioctacontachoron (480 cells)

5. Icosafold icosidodecaswirlchoron (600 vertices) - rhombitriacontaswirlic hexacosichoron (600 cells)

6. Icositetrafold icosidodecaswirlchoron (720 vertices) - rhombitriacontaswirlic heptacosiicosachoron (720 cells)

7. Icosioctafold icosidodecaswirlchoron (840 vertices) - rhombitriacontaswirlic octacositetracontachoron (840 cells)

8. Triacontadifold icosidodecaswirlchoron (960 vertices) - rhombitriacontaswirlic enneacosihexecontachoron (960 cells)

9. Triacontahexafold icosidodecaswirlchoron (1080 vertices) - rhombitriacontaswirlic chilliaoctacontachoron (1080 cells)

10. Tetracontafold icosidodecaswirlchoron (1200 vertices) - rhombitriacontaswirlic chilliadiacosichoron (1200 cells)

12. Tetracontoctafold icosidodecaswirlchoron (1440 vertices) - rhombitriacontaswirlic chilliatetracositetracontachoron (1440 cells)

15. Hexecontafold icosidodecaswirlchoron (1800 vertices, rectangular trapezohedron vertex figure) - rhombitriacontaswirlic chilliaoctacosichoron (1800 rhombic antiprism cells)

20. Octacontafold icosidodecaswirlchoron (2400 vertices) - rhombitriacontaswirlic dischilliatetracosichoron (2400 cells)

25. Hectofold icosidodecaswirlchoron (3000 vertices) - rhombitriacontaswirlic trischilliachoron (3000 cells)

30. Hecatonicosafold icosidodecaswirlchoron (3600 vertices) - rhombitriacontaswirlic trischilliahexacosichoron (3600 cells)

Triangular dihedron-based
1. Triangular duotegum (6 vertices, tetragonal disphenoid vertex figure) - triangular duoprism (6 triangular prisms)

2. 9-2 step prism (9 vertices, ridge-triakis bi-apiculated tetrahedron vertex figure) - 9-2 gyrochoron (9 ridge-truncated edge-truncated tetrahedra)

3. Hexagonal duotegum (12 vertices, tetragonal disphenoid vertex figure) - hexagonal duoprism (12 triangular prisms)

4. 15-4 step prism (15 vertices, paratetraaugmented digonal scalenohedron vertex figure) - 15-4 gyrochoron (15 paratetratruncated rhombic prisms)

5. 18-5 step prism (18 vertices, metabitriakis snub disphenoid vertex figure) - 18-5 gyrochoron (18 metabitruncated elongated gyrobifastigia)

6. 21-8 step prism (21 vertices) - 21-8 gyrochoron (21 cells)

7. 24-5 step prism (24 vertices) - 24-5 gyrochoron (24 cells)

8. 27-8 step prism (27 vertices) - 27-8 gyrochoron (27 cells)

9. 30-11 step prism (30 vertices) - 30-11 gyrochoron (30 cells)

10. 33-10 step prism (33 vertices) - 33-10 gyrochoron (33 cells)

Square dihedron-based
1. Hexadecachoron (8 vertices, octahedron vertex figure) - tesseract (8 cubes)

2. Hexagonal duotegum (12 vertices, tetragonal disphenoid vertex figure) - hexagonal duoprism (12 triangular prisms)

3. 16-3 step prism (16 vertices) - 16-3 gyrochoron (16 cells)

4. Decagonal duotegum (20 vertices, decagonal bipyramid vertex figure) - decagonal duoprism (20 decagonal prisms)

5. 24-5 step prism (24 vertices) - 24-5 gyrochoron (24 cells)

6. Tetradecagonal duotegum (28 vertices, tetradecagonal bipyramid vertex figure) - tetradecagonal duoprism (28 tetradecagonal prisms)

7. 32-7 step prism (32 vertices) - 32-7 gyrochoron (32 cells)

8. Octadecagonal duotegum (36 vertices, octadecagonal bipyramid vertex figure) - octadecagonal duoprism (36 octadecagonal prisms)

9. 40-9 step prism (40 vertices) - 40-9 gyrochoron (40 cells)

10. Icosidigonal duotegum (44 vertices, icosidigonal bipyramid vertex figure) - icosidigonal duoprism (44 icosidigonal prisms)

Pentagonal dihedron-based
1. Pentagonal duotegum (10 vertices, pentagonal bipyramid vertex figure) - pentagonal duoprism (10 pentagonal prisms)

2. 15-2 step prism (15 vertices, ridge-quadritriakis bi-apiculated tetrahedron vertex figure) - 15-2 gyrochoron (12 ridge-quadritruncated edge-truncated tetrahedra)

3. 20-3 step prism (20 vertices) - 20-3 gyrochoron (20 cells)

4. 25-4 step prism (25 vertices) - 25-4 gyrochoron (20 cells)

5. 30-7 step prism (30 vertices) - 30-7 gyrochoron (30 cells)

6. 35-6 step prism (35 vertices) - 35-6 gyrochoron (35 cells)

7. 40-7 step prism (40 vertices) - 40-7 gyrochoron (40 cells)

8. 45-8 step prism (45 vertices) - 45-8 gyrochoron (45 cells)

9. 50-9 step prism (50 vertices) - 50-9 gyrochoron (50 cells)

10. 55-12 step prism (55 vertices) - 55-12 gyrochoron (55 cells)

Hexagonal dihedron-based
1. Hexagonal duotegum (12 vertices, hexagonal bipyramid vertex figure) - hexagonal duoprism (12 hexagonal prisms)

2. 18-5 step prism (18 vertices, metabitriakis snub disphenoid vertex figure) - 18-5 gyrochoron (18 metabitruncated elongated gyrobifastigia)

3. 24-5 step prism (24 vertices) - 24-5 gyrochoron (24 cells)

4. 30-11 step prism (30 vertices) - 30-11 gyrochoron (30 cells)

5. 36-5 step prism (36 vertices) - 36-5 gyrochoron (36 cells)

6. 42-13 step prism (42 vertices) - 42-13 gyrochoron (42 cells)

7. 48-7 step prism (48 vertices) - 48-7 gyrochoron (48 cells)

8. 54-17 step prism (54 vertices) - 54-17 gyrochoron (54 cells)

9. 60-11 step prism (60 vertices) - 60-11 gyrochoron (60 cells)

10. 66-23 step prism (66 vertices) - 66-23 gyrochoron (66 cells)

Digonal antiprism-based
1. Hexadecachoron (8 vertices, octahedron vertex figure) - tesseract (16 cubes)

2. Digonal double antiprismoid (16 vertices, hexakis digonal-hexagonal gyrowedge vertex figure) - digonal double trapezohedroid (16 order-6 truncated digonal-hexagonal gyronotches)

3. 24-7 step prism (24 vertices, paratetraaugmented hexagonal bipyramid vertex figure) - 24-7 gyrochoron (24 paratetratruncated hexagonal prisms)

4. Digonal double tetraswirlprism (32 vertices) - digonal double tetraswirltegum (32 cells)

Triangular antiprism-based
1. Triangular duoantiprism (18 vertices, gyrobifastigium vertex figure) - triangular duoantitegum (18 elongated tetragonal disphenoids)

2. Triangular double antiprismoid (36 vertices, sphenocorona vertex figure) - triangular double trapezohedroid (36 order-5 truncated bi-apiculated tetrahedra)

3. Triangular double triswirlprism (54 vertices) - triangular double triswirltegum (54 cells)

4. Triangular double tetraswirlprism (72 vertices) - triangular double tetraswirltegum (72 cells)

Square antiprism-based
1. Square duoantiprism (32 vertices, gyrobifastigium vertex figure) - square duoantitegum (32 elongated tetragonal disphenoids)

2. Square double antiprismoid (64 vertices, sphenocorona vertex figure) - square double trapezohedroid (64 order-5 truncated bi-apiculated tetrahedra)

3. Square double triswirlprism (96 vertices) - square double triswirltegum (96 cells)

4. Square double tetraswirlprism (128 vertices) - square double tetraswirltegum (128 cells)

Pentagonal antiprism-based
1. Pentagonal duoantiprism (50 vertices, gyrobifastigium vertex figure) - pentagonal duoantitegum (50 elongated tetragonal disphenoids)

2. Grand antiprism (100 vertices, sphenocorona vertex figure) - pentagonal double trapezohedroid (100 order-5 truncated bi-apiculated tetrahedra)

3. Pentagonal double triswirlprism (150 vertices) - pentagonal double triswirltegum (150 cells)

4. Pentagonal double tetraswirlprism (200 vertices) - pentagonal double tetraswirltegum (200 cells)

Hexagonal antiprism-based
1. Hexagonal duoantiprism (72 vertices, gyrobifastigium vertex figure) - hexagonal duoantitegum (72 elongated tetragonal disphenoids)

2. Hexagonal double antiprismoid (144 vertices, sphenocorona vertex figure) - hexagonal double trapezohedroid (144 order-5 truncated bi-apiculated tetrahedra)

3. Hexagonal double triswirlprism (216 vertices) - hexagonal double triswirltegum (216 cells)

4. Hexagonal double tetraswirlprism (288 vertices) - hexagonal double tetraswirltegum (288 cells)