0,6

Diagonals : A000007, A001469, A005440; A000182, A005990 . Row sums : A001469.

D. Dumont, Sur une conjecture de Gandhi concernant les nombres de Genocchi. Discrete Mathematics 1(1972), 321-327.

D. Dumont, Interpretations combinatoires des nombres de Genocchi, Duke Math.J., 41(2)(1974), 305-318.

J. M. Gandhi, A conjectured representation of Genocchi numbers, Amer. Math. Monthly, 77(1)(1970), 505-506.

For n>=1, Sum_{k =1..n} T(n, k)*x^(k-1) = G(x, n), n-th Gandhi polynomial; the Gandhi polynomials are defined by : G(x, n)= (x+1)^2*G(x+1, n-1) - x^2*G(x, n-1), G(x, 1) = 1 . Sum_{k =0..n} T(n, k)*2^(2n-k) = A000182(n+1), tangent numbers . Sum_{k =0..n} T(n, k) = A001469(n+1), Genocchi numbers of first kind.

Sum_{k = 0..n} T(n, k)*2^(n-k) = A002105(n+1) . - DELEHAM Philippe (kolotoko(AT)wanadoo.fr), Jun 10 2004

Triangle begins:

1;

0, 1;

0, 1, 2;

0, 3, 8, 6;

0, 17, 54, 60, 24;

0, 155, 556, 762, 480, 120;

0, 2073, 8146, 12840, 10248, 4200, 720;

0, 38227, 161424, 282078, 263040, 139440, 40320, 5040;

0, 929569, 4163438, 7886580, 8240952, 5170800, 1965600, 423360, 40320 ;...

Cf. A094665 A083061.

Sequence in context: A127160 A131330 A020826 this_sequence A074104 A071411 A121065

Adjacent sequences: A094343 A094344 A094345 this_sequence A094347 A094348 A094349

nonn,tabl

DELEHAM Philippe (kolotoko(AT)wanadoo.fr), Jun 08 2004, Jun 13 2007