A378473 -id:A378473 - cp's OEIS frontend

A378474 The number of n-colorings of the vertices of the truncated cuboctahedron up to rotation and reflection.

0, 1, 5864068667776, 1661800897546646288751, 1650586719047285117763813376, 74014868308343792955106160546875, 467755368903219944377426648894114176, 764653504526960946768130306131125170501, 464598858302721315450530067459906444722176

Offset: 0

Peter Kagey, Nov 27 2024

Equivalently, the number of n-colorings of the faces of the disdyakis dodecahedron, which is the polyhedral dual of the truncated cuboctahedron.

Colorings are counted up to the full octahedral group of order 48.

Wikipedia, Disdyakis dodecahedron
Wikipedia, Truncated cuboctahedron

Cf. A000332, A060530, A128766, A199406, A252704, A252705, A274900, A337963, A378473, A378475, A378476, A378477, A378478.

a(n) = (1/48)*(n^48 + 19*n^24 + 8*n^16 + 12*n^12 + 8*n^8).

Asymptotically, a(n) ~ n^48/48.

A378475 The number of n-colorings of the vertices of the snub cube up to rotation.

Original entry on oeis.org

0, 1, 700688, 11768099013, 11728130343936, 2483526957328125, 197432556580265616, 7982551312716034313, 196765270145344012288, 3323601794975613468921, 41666666667041700250000, 410405528159827444816781, 3312368633477962187301888, 22616698765607508420521013

Offset: 0

Peter Kagey, Nov 27 2024

nonn

Equivalently, the number of n-colorings of the faces of the pentagonal icositetrahedron, which is the polyhedral dual of the snub cube.
Colorings are counted up to the rotational octahedral symmetry group of order 24.
This is also:
1) The number of n-colorings of the vertices of the truncated octahedron (equivalently faces of the tetrakis hexahedron) up to rotational octahedral symmetry (alternatively full tetrahedral symmetry).
2) The number of n-colorings of the vertices of the truncated cube (equivalently faces of the triakis octahedron) up to rotational octahedral symmetry.

Wikipedia, Pentagonal icositetrahedron
Wikipedia, Snub cube

Cf. A000332, A060530, A128766, A199406, A252704, A252705, A274900, A337963, A378473, A378474, A378476, A378477, A378478.

a(n) = (1/24)*(n^24 + 9*n^12 + 8*n^8 + 6*n^6).

Asymptotically, a(n) ~ n^24/24.

A378476 The number of n-colorings of the vertices of the truncated dodecahedron up to rotation and reflection.

Original entry on oeis.org

0, 1, 9607679885269312, 353259652293727442874919719, 11076899964874301400431118585745408, 7228014483236696229750911410649667971875, 407280649839077145745380578110103790290896704, 4233515506163528044351709372473136729199352546645

Offset: 0

Peter Kagey, Nov 27 2024

Equivalently,
1) the number of n-colorings of the faces of the triakis icosahedron, which is the polyhedral dual of the truncated dodecahedron.
2) the number of n-colorings of the faces of the pentakis dodecahedron, or n-colorings of the vertices of the truncated icosahedron, its polyhedral dual.
3) the number of n-colorings of the faces of the deltoidal hexecontahedron, or n-colorings of the vertices of the rhombicosidodecahedron, its polyhedral dual.
Colorings are counted up to the full icosahedral symmetry group of order 120.

Cf. A000332, A060530, A128766, A199406, A252704, A252705, A274900, A337963, A378473, A378474, A378475, A378477, A378478.

a(n) = (1/120)*(n^60 + 15*n^32 + 16*n^30 + 20*n^20 + 24*n^12 + 20*n^10 + 24*n^6).

Asymptotically, a(n) ~ n^60/120.

a(0) = 0 prepended by Georg Fischer, Apr 16 2025

A378477 The number of n-colorings of the vertices of the truncated icosidodecahedron up to rotation and reflection.

Original entry on oeis.org

0, 1, 11076899964874299238703297447907328, 14975085832620260086776498590197757887552760437584786915, 14723725539819869413194145839524321308612931385268246121155792029614080, 6269303204385533375833261531851976948366440371233447120478861810030555725146484375

Offset: 0

Peter Kagey, Nov 27 2024

nonn

Equivalently, the number of n-colorings of the faces of the disdyakis triacontahedron, which is the polyhedral dual of the truncated octahedron.

Colorings are counted up to the full icosahedral symmetry group of order 120.

Wikipedia, Disdyakis triacontahedron
Wikipedia, Truncated icosidodecahedron

Cf. A000332, A060530, A128766, A199406, A252704, A252705, A274900, A337963, A378473, A378474, A378475, A378476, A378478.

a(n) = 1/120*(n^120 + 31*n^60 + 20*n^40 + 24*n^24 + 20*n^20 + 24*n^12).

Asymptotically, a(n) ~ n^120/120

A378478 The number of n-colorings of the vertices of the snub dodecahedron up to rotation.

Original entry on oeis.org

0, 1, 19215358678900736, 706519304586988199183738259, 22153799929748598169960860333637632, 14456028966473392453665534687042333984375, 814561299678154291488767806377392301451223040, 8467031012327056088703142262372040966699399765293

Offset: 0

Peter Kagey, Nov 27 2024

nonn

Equivalently, the number of n-colorings of the faces of the pentagonal hexecontahedron, which is the polyhedral dual of the snub dodecahedron.

Colorings are counted up to the rotational icosahedral symmetry group of order 60.

Wikipedia, Pentagonal hexecontahedron
Wikipedia, Snub dodecahedron

Cf. A000332, A060530, A128766, A199406, A252704, A252705, A274900, A337963, A378473, A378474, A378475, A378476, A378477.

a(n) = 1/60*(n^60 + 15*n^30 + 20*n^20 + 24*n^12).

Asymptotically, a(n) ~ n^60/60.

cp's OEIS Frontend

A378474 The number of n-colorings of the vertices of the truncated cuboctahedron up to rotation and reflection.

Views

Author

Keywords

Comments

Links

Crossrefs

Formula

A378475 The number of n-colorings of the vertices of the snub cube up to rotation.

Views

Author

Keywords

Comments

Links

Crossrefs

Formula

A378476 The number of n-colorings of the vertices of the truncated dodecahedron up to rotation and reflection.

Views

Author

Keywords

Comments

Links

Crossrefs

Formula

Extensions

A378477 The number of n-colorings of the vertices of the truncated icosidodecahedron up to rotation and reflection.

Views

Author

Keywords

Comments

Links

Crossrefs

Formula

A378478 The number of n-colorings of the vertices of the snub dodecahedron up to rotation.

Views

Author

Keywords

Comments

Links

Crossrefs

Formula