A256549 - OEIS

A256549

Triangle read by rows, T(n,k) = {n,k}*h(k), where {n,k} are the Stirling set numbers and h(k) = hypergeom([-k+1,-k],[],1), for n>=0 and 0<=k<=n.

1, 0, 1, 0, 1, 3, 0, 1, 9, 13, 0, 1, 21, 78, 73, 0, 1, 45, 325, 730, 501, 0, 1, 93, 1170, 4745, 7515, 4051, 0, 1, 189, 3913, 25550, 70140, 85071, 37633, 0, 1, 381, 12558, 124173, 526050, 1077566, 1053724, 394353, 0, 1, 765, 39325, 567210, 3482451, 10718946, 17386446, 14196708, 4596553

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OFFSET

0,6

LINKS

Table of n, a(n) for n=0..54.

FORMULA

Row sums are A075729.

Alternating row sums are the signed Bell numbers (-1)^n*A000110(n).

T(n,k) = A048993(n,k)*A000262(k).

T(n,n) = A000262(n).

T(n+2,2) = A068156(n).

EXAMPLE

Triangle starts:

[1]

[0, 1]

[0, 1, 3]

[0, 1, 9, 13]

[0, 1, 21, 78, 73]

[0, 1, 45, 325, 730, 501]

[0, 1, 93, 1170, 4745, 7515, 4051]

PROG

(Sage)

A000262 = lambda n: simplify(hypergeometric([-n+1, -n], [], 1))

A256549 = lambda n, k: A000262(k)*stirling_number2(n, k)

for n in range(7): [A256549(n, k) for k in (0..n)]

CROSSREFS

Cf. A000110, A000262, A048993, A068156, A075729.

Sequence in context: A136239 A225443 A222060 * A211608 A058175 A353010

Adjacent sequences: A256546 A256547 A256548 * A256550 A256551 A256552

KEYWORD

nonn,tabl,easy

AUTHOR

Peter Luschny, Apr 12 2015

STATUS

approved