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A294986
Number of compositions (ordered partitions) of 1 into exactly 7n+1 powers of 1/(n+1).
2
1, 41245, 4561368175, 1104353764428365, 396695587555058190126, 174436242482643190451211853, 86237678200608256132213084584295, 46050764886573707269872023694736134925, 25997337847684377365651388718120083246723460
OFFSET
0,2
LINKS
FORMULA
a(n) ~ 7^(7*n + 3/2) / (8 * Pi^3 * n^3). - Vaclav Kotesovec, Sep 20 2019
MAPLE
b:= proc(n, r, p, k) option remember;
`if`(n<r, 0, `if`(r=0, `if`(n=0, p!, 0), add(
b(n-j, k*(r-j), p+j, k)/j!, j=0..min(n, r))))
end:
a:= n-> (k-> `if`(n=0, 1, b(k*n+1, 1, 0, n+1)))(7):
seq(a(n), n=0..12);
MATHEMATICA
b[n_, r_, p_, k_] := b[n, r, p, k] = If[n < r, 0, If[r == 0, If[n == 0, p!, 0], Sum[b[n - j, k*(r - j), p + j, k]/j!, {j, 0, Min[n, r]}]]];
a[n_] := If[n == 0, 1, b[#*n + 1, 1, 0, n + 1]]&[7];
Table[a[n], {n, 0, 12}] (* Jean-François Alcover, May 21 2018, translated from Maple *)
CROSSREFS
Row n=7 of A294746.
Sequence in context: A188488 A027577 A235317 * A269738 A269737 A233714
KEYWORD
nonn
AUTHOR
Alois P. Heinz, Nov 12 2017
STATUS
approved