cp's OEIS Frontend

This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.

Showing 1-4 of 4 results.

A143565 Triangle T(n,k), n>=1, 1<=k<=n, where the e.g.f. for column k satisfies: A_k(x) = exp(x*A_k(x^k/k!)).

Original entry on oeis.org

1, 3, 1, 16, 4, 1, 125, 13, 5, 1, 1296, 46, 21, 6, 1, 16807, 241, 61, 31, 7, 1, 262144, 1471, 211, 106, 43, 8, 1, 4782969, 9409, 1401, 281, 169, 57, 9, 1, 100000000, 67348, 8065, 946, 505, 253, 73, 10, 1, 2357947691, 564841, 37241, 7561, 1261, 841, 361, 91, 11, 1
Offset: 1

Views

Author

Alois P. Heinz, Aug 24 2008

Keywords

Examples

			Triangle begins:
       1;
       3,    1;
      16,    4,    1;
     125,   13,    5,    1;
    1296,   46,   21,    6,    1;
   16807,  241,   61,   31,    7,    1;
  262144, 1471,  211,  106,   43,    8,    1;
  ...

Links

Crossrefs

Columns 1-9: A000272, A143566, A143567, A143568, A143569, A143570, A143571, A143572, A143573.
T(2n,n) gives A319924.

Programs

  • Maple
    A:= proc(n,k::posint) option remember; if n<=0 then 1 else unapply(
      convert(series(exp(x*A(n-k,k)(x^k/k!)), x,n+1), polynom),x) fi
    end:
T:= (n,k)-> coeff(A(n,k)(x), x,n)*n!:
seq(seq(T(n,k), k=1..n), n=1..12);
  • Mathematica
    a[n_, k_] := a[n, k] = If[n <= 0, 1&, Function[x, Series[E^(x*a[n - k, k][x^k/k!]), {x, 0, n+1}] // Normal // Evaluate]]; t[n_, k_] := Coefficient[a[n, k][x], x, n]*n!; Flatten[Table[Table[t[n, k], {k, 1, n}], {n, 1, 12}]] (* Jean-François Alcover, Dec 16 2013, translated from Maple *)

Formula

E.g.f. for column k satisfies: A_k(x) = exp(x*A_k(x^k/k!)).
T(0,k) = 1; T(n,k) = (n-1)! * Sum_{j=0..floor((n-1)/k)} (k*j+1) * T(j,k) * T(n-1-k*j,k) / (k!^j * j! * (n-1-k*j)!). - Seiichi Manyama, Nov 28 2023

A354551 Expansion of e.g.f. exp( x * exp(x^3/6) ).

Original entry on oeis.org

1, 1, 1, 1, 5, 21, 61, 211, 1401, 8065, 37241, 240021, 1997821, 13856701, 94418325, 874328911, 8304303281, 69158458881, 658339599601, 7454839614985, 78224066633781, 805961931388741, 9828080719704941, 124199805022959051, 1466207770078872745
Offset: 0

Views

Author

Seiichi Manyama, Aug 18 2022

Keywords

Comments

This sequence is different from A143567.

Links

Crossrefs

Cf. A000248, A354550, A354552.

Programs

  • Mathematica
    With[{nn=30},CoefficientList[Series[Exp[x*Exp[x^3/6]],{x,0,nn}],x] Range[0,nn]!] (* Harvey P. Dale, Mar 03 2025 *)
  • PARI
    my(N=30, x='x+O('x^N)); Vec(serlaplace(exp(x*(exp(x^3/6)))))
  • PARI
    a(n) = n!*sum(k=0, n\3, (n-3*k)^k/(6^k*k!*(n-3*k)!));

Formula

a(n) = n! * Sum_{k=0..floor(n/3)} (n - 3*k)^k/(6^k * k! * (n - 3*k)!).

A367755 E.g.f. satisfies A(x) = exp(x * (1 + x + x^2) * A(x^3/6)).

Original entry on oeis.org

1, 1, 3, 13, 53, 301, 1951, 13203, 105673, 919873, 8472491, 86799241, 948033373, 10924180853, 135880443063, 1780842778471, 24496224075921, 357483642165313, 5454904465819603, 86909842633518373, 1453042115780967941, 25262405474642837341
Offset: 0

Views

Author

Seiichi Manyama, Nov 29 2023

Keywords

Crossrefs

Cf. A367754, A367756, A367757.
Cf. A143567.

Programs

  • PARI
    a_vector(n) = my(v=vector(n+1)); v[1]=1; for(i=1, n, v[i+1]=(i-1)!*sum(j=0, i-1, (j+1)*v[j\3+1]*v[i-j]/(6^(j\3)*(j\3)!*(i-1-j)!))); v;

Formula

a(0) = 1; a(n) = (n-1)! * Sum_{k=0..n-1} (k+1) * a(floor(k/3)) * a(n-1-k) / (6^floor(k/3) * floor(k/3)! * (n-1-k)!).

A362661 E.g.f. satisfies A(x) = exp( x * exp(x^3/6) * A(x) ).

Original entry on oeis.org

1, 1, 3, 16, 129, 1356, 17767, 279714, 5149209, 108591688, 2582351451, 68380940904, 1995777685717, 63659665732716, 2203395556479951, 82253291389678756, 3294326092613575473, 140911264444599281616, 6411278790217738946899
Offset: 0

Views

Author

Seiichi Manyama, Apr 29 2023

Keywords

Links

Crossrefs

Cf. A273954, A362660.
Cf. A143567, A354551, A362655.

Programs

  • PARI
    my(N=20, x='x+O('x^N)); Vec(serlaplace(exp(-lambertw(-x*exp(x^3/6)))))

Formula

E.g.f.: exp( -LambertW(-x * exp(x^3/6)) ).
a(n) = n! * Sum_{k=0..floor(n/3)} (n-3*k)^k * (n-3*k+1)^(n-3*k-1) / (6^k * k! * (n-3*k)!).
Showing 1-4 of 4 results.

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