A167981 -id:A167981 - cp's OEIS frontend

A167982 Number of n-cycles on the graph of the regular 16-cell, 3 <= n <= 8.

32, 102, 288, 640, 960, 744

Offset: 3

Andrew Weimholt, Nov 16 2009

Row n=3 of the triangle in A167986

The 16-cell is the dual polytope of the tesseract, and is one of 6 regular convex polytopes in 4 dimensions. The Schläfli symbol for the 16-cell is {3,3,4}.

			a(3) = 32, because there are 32 3-cycles on the graph of the 16-cell.
Cycle polynomial is 32*x^3 + 102*x^4 + 288*x^5 + 640*x^6 + 960*x^7 + 744*x^8.

A. Weimholt, 16-cell net
Eric Weisstein's World of Mathematics, 16-Cell
Eric Weisstein's World of Mathematics, Cycle Polynomial

Cf. A167981 (2n-cycles on graph of the tesseract).
Cf. A167983 (n-cycles on graph of 24-cell).
Cf. A167984 (n-cycles on graph of 120-cell).
Cf. A167985 (n-cycles on graph of 600-cell).
Cf. A085452 (2k-cycles on graph of n-cube).
Cf. A144151 (ignoring first three columns (0<=k<=2), k-cycles on (n-1)-simplex).
Cf. A167986 (k-cycles on graph of n-orthoplex).

A167983 Number of n-cycles on the graph of the regular 24-cell, 3 <= n <= 24.

Original entry on oeis.org

96, 360, 1440, 7120, 37728, 196488, 974592, 4536000, 19934208, 82689264, 322437312, 1171745280, 3924079104, 11964375936, 32761139328, 79244294016, 165800420352, 291640320576, 413774810112, 443415854592, 318534709248, 114869295744

Offset: 3

Andrew Weimholt, Nov 16 2009

The 24-cell is one of 6 regular convex polytopes in 4 dimensions. The Schläfli symbol of the 24-cell is {3,4,3}.

			a(3) = 96, because there are 96 3-cycles on the graph of the 24-cell.
Cycle polynomial is 96*x^3 + 360*x^4 + 1440*x^5 + 7120*x^6 + 37728*x^7 + 196488*x^8 + 974592*x^9 + 4536000*x^10 + 19934208*x^11 + 82689264*x^12 + 322437312*x^13 + 1171745280*x^14 + 3924079104*x^15 + 11964375936*x^16 + 32761139328*x^17 + 79244294016*x^18 + 165800420352*x^19 + 291640320576*x^20 + 413774810112*x^21 + 443415854592*x^22 + 318534709248*x^23 + 114869295744*x^24.

Max Alekseyev, PARI/GP scripts for various math problems
Max A. Alekseyev, Gérard P. Michon, Making Walks Count: From Silent Circles to Hamiltonian Cycles, arXiv:1602.01396 [math.CO], 2016.
A. Weimholt, 24-cell net
Eric Weisstein's World of Mathematics, 24-Cell
Eric Weisstein's World of Mathematics, Cycle Polynomial

Cf. A167981 (2n-cycles on graph of the tesseract).
Cf. A167982 (n-cycles on graph of 16-cell).
Cf. A167984 (n-cycles on graph of 120-cell).
Cf. A167985 (n-cycles on graph of 600-cell).
Cf. A085452 (2k-cycles on graph of n-cube).
Cf. A144151 (ignoring first three columns (0<=k<=2), k-cycles on (n-1)-simplex).
Cf. A167986 (k-cycles on graph of n-orthoplex).

a(16)-a(24) and "full" keyword from Max Alekseyev, Nov 18 2009

A167984 Number of n-cycles on the graph of the regular 120-cell, 3 <= n <= 600.

Original entry on oeis.org

0, 0, 720, 0, 0, 3600, 2400, 4320, 28800, 35400, 64800, 284400, 540000, 1139400, 3708000, 8557200, 19677600, 55725120, 140359200, 346456800, 935942400, 2442469200, 6282571680

Offset: 3

Andrew Weimholt, Nov 16 2009

The 120-cell is one of 6 regular convex polytopes in 4 dimensions. The Schläfli symbol of the 120-cell is {5,3,3}.

			a(5) = 720, because there are 720 5-cycles on the graph of the 120-cell.
Cycle polynomial is 720*x^5 + 3600*x^8 + 2400*x^9 + 4320*x^10 + 28800*x^11 + 35400*x^12 + 64800*x^13 +  284400*x^14 + 540000*x^15 + 1139400*x^16 + 3708000*x^17 + 8557200*x^18 + 19677600*x^19 + 55725120*x^20 + 140359200*x^21 + 346456800*x^22 + 935942400*x^23 + ...

A. Weimholt, 120-cell net
Eric Weisstein's World of Mathematics, 120-Cell
Eric Weisstein's World of Mathematics, Cycle Polynomial

Cf. A167981 (2n-cycles on graph of the tesseract).
Cf. A167982 (n-cycles on graph of 16-cell).
Cf. A167983 (n-cycles on graph of 24-cell).
Cf. A167985 (n-cycles on graph of 600-cell).
Cf. A085452 (2k-cycles on graph of n-cube).
Cf. A144151 (ignoring first three columns (0<=k<=2), k-cycles on (n-1)-simplex).
Cf. A167986 (k-cycles on graph of n-orthoplex).
Cf. A108997 (number of vertices n-steps from a given vertex on graph of 120-cell).

a(24) from Eric W. Weisstein, Feb 21 2014

a(25) from Eric W. Weisstein, Mar 11 2014

A167985 Number of n-cycles on the graph of the regular 600-cell, 3 <= n <= 120.

Original entry on oeis.org

1200, 5400, 29520, 187200, 1310400, 9813600, 77193600, 630538632, 5307656400

Offset: 3

Andrew Weimholt, Nov 16 2009

The 600-cell is one of 6 regular convex polytopes in 4 dimensions. The Schläfli symbol for the 600-cell is {3,3,5}.

			a(3) = 1200, because there are 1200 3-cycles on the graph of the 600-cell.
Cycle polynomial is 1200*x^3 + 5400*x^4 + 29520*x^5 + 187200*x^6 + 1310400*x^7 + 9813600*x^8 + 77193600*x^9 + 630538632*x^10 + ...

A. Weimholt, 600-cell net
Eric Weisstein's World of Mathematics, 600-Cell
Eric Weisstein's World of Mathematics, Cycle Polynomial

Cf. A167981 (2n-cycles on graph of the tesseract).
Cf. A167982 (n-cycles on graph of 16-cell).
Cf. A167983 (n-cycles on graph of 24-cell).
Cf. A167984 (n-cycles on graph of 120-cell).
Cf. A085452 (2k-cycles on graph of n-cube).
Cf. A144151 (ignoring first three columns (0<=k<=2), k-cycles on (n-1)-simplex).
Cf. A167986 (k-cycles on graph of n-orthoplex).
Cf. A118785 (number of vertices n-steps from a given vertex on graph of the 600-cell).

a(11) from Eric W. Weisstein, Feb 09 2014

cp's OEIS Frontend

A167982 Number of n-cycles on the graph of the regular 16-cell, 3 <= n <= 8.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

A167983 Number of n-cycles on the graph of the regular 24-cell, 3 <= n <= 24.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Extensions

A167984 Number of n-cycles on the graph of the regular 120-cell, 3 <= n <= 600.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Extensions

A167985 Number of n-cycles on the graph of the regular 600-cell, 3 <= n <= 120.

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Extensions