A278993 -id:A278993 - cp's OEIS frontend

A278991 a(n) is the number of simple linear diagrams with n+1 chords.

0, 1, 3, 24, 211, 2325, 30198, 452809, 7695777, 146193678, 3069668575, 70595504859, 1764755571192, 47645601726541, 1381657584006399, 42829752879449400, 1413337528735664887, 49465522112961344241, 1830184115528550306438, 71375848864779552073957

Offset: 0

N. J. A. Sloane, Dec 07 2016

nonn

Gheorghe Coserea, Table of n, a(n) for n = 0..301
E. Krasko and A. Omelchenko, Enumeration of Chord Diagrams without Loops and Parallel Chords, arXiv preprint arXiv:1601.05073 [math.CO], 2016.
E. Krasko and A. Omelchenko, Enumeration of Chord Diagrams without Loops and Parallel Chords, The Electronic Journal of Combinatorics, 24(3) (2017), #P3.43.

Cf. A003436, A003437, A007474, A278990, A278992, A278993, A278994.

a[0] = 0; a[1] = 1; a[2] = 3; a[n_] := a[n] = (2 n - 1) a[n - 1] + (4 n - 3) a[n - 2] + (2 n - 4) a[n - 3]; Table[a@ n, {n, 0, 19}] (* Michael De Vlieger, Dec 10 2016 *)

seq(N) = {
  my(a = vector(N)); a[1]=1; a[2]=3; a[3]=24;
  for (n=4, N, a[n] = (2*n-1)*a[n-1] + (4*n-3)*a[n-2] + (2*n-4)*a[n-3]);
  concat(0, a);
};
seq(20) \\ Gheorghe Coserea, Dec 10 2016

N = 20; x = 'x + O('x^N);
concat(0, Vec(serlaplace((1-sqrt(1-2*x))*(1-2*x)^(-3/2)*exp(-1-x+sqrt(1-2*x))))) \\ Gheorghe Coserea, Dec 10 2016

E.g.f.: (1-sqrt(1-2*x))*(1-2*x)^(-3/2)*exp(-1-x+sqrt(1-2*x)).
a(n) ~ 2^(n+3/2) * n^(n+1) / exp(n+3/2). - Vaclav Kotesovec, Dec 07 2016
a(n) = (2*n-1)*a(n-1) + (4*n-3)*a(n-2) + (2*n-4)*a(n-3). - Gheorghe Coserea, Dec 10 2016

Offset corrected by Gheorghe Coserea, Dec 10 2016

A278992 Number of simple chord-labeled chord diagrams with n chords.

Original entry on oeis.org

0, 1, 1, 21, 168, 1968, 26094, 398653, 6872377, 132050271, 2798695656, 64866063276, 1632224748984, 44316286165297, 1291392786926821, 40202651019430461, 1331640833909877144, 46762037794122159492, 1735328399106396110310, 67858430028772637693845

Offset: 1

N. J. A. Sloane, Dec 07 2016

nonn

E. Krasko and A. Omelchenko, Enumeration of Chord Diagrams without Loops and Parallel Chords, arXiv preprint arXiv:1601.05073 [math.CO], 2016.
E. Krasko and A. Omelchenko, Enumeration of Chord Diagrams without Loops and Parallel Chords, The Electronic Journal of Combinatorics, 24(3) (2017), #P3.43.

Cf. A003436, A003437, A007474, A278990, A278991, A278993, A278994.

terms = 20;
CoefficientList[(Sqrt[1 - 2t]+1)(1/Sqrt[1 - 2t])*E^(Sqrt[1 - 2t] - t - 1) - (2-t)/E^t + O[t]^(terms+1), t]*Range[0, terms]! // Rest (* Jean-François Alcover, Sep 14 2018 *)

E.g.f.: (1+sqrt(1-2*t))*(1-2*t)^(-1/2)*exp(-1-t+sqrt(1-2*t))-(2-t)*exp(-t).
a(n) ~ 2^(n+1/2) * n^n / exp(n+3/2). - Vaclav Kotesovec, Dec 07 2016
Conjecture D-finite with recurrence: +(-n+2)*a(n) +(2*n^2-8*n+7)*a(n-1) +(6*n^2-18*n+11)*a(n-2) +(n-1)*(6*n-11)*a(n-3) +2*(n-1)*(n-2)*a(n-4)=0. - R. J. Mathar, Jan 27 2020

A278994 Number of simple chord diagrams with n chords, modulo all symmetries.

Original entry on oeis.org

0, 1, 1, 4, 18, 116, 1060, 13019, 193425, 3313522, 63667788, 1351700744, 31390695708, 791372281393, 21523271532811, 628166776833181, 19582955637428422, 649472761243051940, 22833268501579122332, 848230375982060558217

Offset: 1

N. J. A. Sloane, Dec 07 2016

nonn

E. Krasko and A. Omelchenko, Enumeration of Chord Diagrams without Loops and Parallel Chords, arXiv preprint arXiv:1601.05073 [math.CO], 2016.
E. Krasko and A. Omelchenko, Enumeration of Chord Diagrams without Loops and Parallel Chords, The Electronic Journal of Combinatorics, 24(3) (2017), #P3.43.

Cf. A003436, A003437, A007474, A278990, A278991, A278992, A278993.

cp's OEIS Frontend

A278991 a(n) is the number of simple linear diagrams with n+1 chords.

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A278992 Number of simple chord-labeled chord diagrams with n chords.

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Author

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Programs

Mathematica

Formula

A278994 Number of simple chord diagrams with n chords, modulo all symmetries.

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Author

Keywords

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