A381862 -id:A381862 - cp's OEIS frontend

A054647 Number of labeled pure 2-complexes on n nodes (0-simplexes) with 4 2-simplexes and 12 1-simplexes.

30, 2310, 42840, 391545, 2375100, 10980585, 41761720, 136963255, 399689290, 1060984925, 2603641040, 5979294230, 12973080120, 26794003110, 53000811600, 100914240770, 185718969590, 331524753560, 575738427880, 975199600375, 1614655942900, 2618302433175

Offset: 6

Vladeta Jovovic, Apr 16 2000

Number of {T_1,T_2,...,T_k} where T_i,i=1..k are 3-subsets of an n-set such that {D | D is 2-subset of T_i for some i=1..k} has l elements; k=4,l=12.

Numbers of sets of 4 triangles that are pairwise edge-disjoint in the complete graph K_n. - Julian Allagan, Mar 08 2025

Julian Allagan, Edge-Disjoint Triangle Packings in Complete Graphs: Recurrence Relations and Closed Formulas (submitted 2025)
V. Jovovic, On the number of two-dimensional simplicial complexes (in Russian), Metody i sistemy tekhnicheskoy diagnostiki, Vypusk 16, Mezhvuzovskiy zbornik nauchnykh trudov, Izdatelstvo Saratovskogo universiteta, 1991.

T. D. Noe, Table of n, a(n) for n = 6..1000
Index entries for linear recurrences with constant coefficients, signature (13,-78,286,-715,1287,-1716,1716,-1287,715,-286,78,-13,1).

Cf. A054557, A054558, A054559, A054560, A054561, A054562, A381862, A381863.

a(n) = 30*C(n, 6)+2100*C(n, 7)+25200*C(n, 8)+86625*C(n, 9)+116550*C(n, 10)+69300*C(n, 11)+15400*C(n, 12) = n*(n-1)*(n-2)*(n-3)*(n-4)*(n-5)*(n^6+3*n^5-86*n^4-240*n^3+2704*n^2+5232*n-34128)/31104.

G.f.: 5*x^6*(169*x^6-1119*x^5+2535*x^4-1245*x^3-3030*x^2-384*x-6)/(x-1)^13. [Colin Barker, Jun 22 2012]

More terms from James Sellers, Apr 16 2000

A381863 Number of triples of triangles that are pairwise edge-disjoint in the complete graph K_n.

Original entry on oeis.org

120, 1575, 10080, 44380, 154000, 451990, 1170400, 2748460, 5965960, 12137125, 23383360, 43006600, 75988640, 129645740, 214472000, 345209480, 542187800, 832980995, 1254434720, 1855122500, 2698295600, 3865397250, 5460218400, 7613778900, 10490025000

Offset: 6

Julian Allagan, Mar 08 2025

			a(6) = 120 gives the number of triples of edge-disjoint triangles in K_6.

Julian Allagan, Edge-Disjoint Triangle Packings in Complete Graphs: Recurrence Relations and Closed Formulas. A revised proof version is to submitted to a Journal.

Andrew Howroyd, Table of n, a(n) for n = 6..1000
Index entries for linear recurrences with constant coefficients, signature (10,-45,120,-210,252,-210,120,-45,10,-1).

Cf. A381862, A054647.

a[n_] := 120*Binomial[n, 6] + 735*Binomial[n, 7] + 840*Binomial[n, 8] + 280*Binomial[n, 9];
sequenceValues = Table[a[n], {n, 6, 30}]

a(n) = 120*binomial(n, 6) + 735*binomial(n, 7) + 840*binomial(n, 8) + 280*binomial(n, 9).

G.f.: 5*x^6*(24 + 75*x - 54*x^2 + 11*x^3)/(1 - x)^10.

cp's OEIS Frontend

A054647 Number of labeled pure 2-complexes on n nodes (0-simplexes) with 4 2-simplexes and 12 1-simplexes.

Views

Author

Keywords

Comments

References

Links

Crossrefs

Formula

Extensions