A175721 Array T(n,m) read by antidiagonals: the coefficient of [x^m] of 1/(-x^n + 1 - x^(1+n) + x + 3*x^(2+n) - 2*x^2 - x^(3+n)) in row n, column 1 <= m.
0, 3, -1, -3, 4, -1, 10, -6, 3, -1, -18, 14, -4, 3, -1, 42, -24, 10, -5, 3, -1, -87, 47, -19, 12, -5, 3, -1, 190, -83, 42, -22, 11, -5, 3, -1, -405, 152, -84, 45, -20, 11, -5, 3, -1
Offset: 1
Examples
The array starts in row n=1 with columns m >= 1 as 0, 3, -3, 10, -18, 42, -87, 190, -405, 873, ... A077899 -1, 4, -6, 14, -24, 47, -83, 152, -268, 476, ... A175722 -1, 3, -4, 10, -19, 42, -84, 174, -353, 726, ... -1, 3, -5, 12, -22, 45, -87, 174, -340, 670, ... -1, 3, -5, 11, -20, 42, -83, 169, -339, 686, ... -1, 3, -5, 11, -21, 44, -86, 173, -343, 685, ... -1, 3, -5, 11, -21, 43, -84, 170, -339, 681, ... -1, 3, -5, 11, -21, 43, -85, 172, -342, 685, ... -1, 3, -5, 11, -21, 43, -85, 171, -340, 682, ... -1, 3, -5, 11, -21, 43, -85, 171, -341, 684, ...
Programs
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Maple
A175721 := proc(m,k) 1/(-x^m + 1 - x^(1 + m) + x + 3*x^(2 + m) - 2* x^2 - x^(3 + m)) ; coeftayl(%,x=0,k) ; end proc: # R. J. Mathar, Dec 22 2010
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Mathematica
f[x_, m_] = ExpandAll[(x - x^(m + 1))*(1 - x - x^2) - (1 - 2*x + x^(m + 1))]; g[x_, n_] = ExpandAll[x^(m + 3)*f[1/x, m]]; a = Table[Table[SeriesCoefficient[ Series[1/g[x, m], {x, 0, 10}], n], {n, 0, 10}], {m, 1, 10}]; Table[Table[a[[m, n - m + 1]], {m, 1, n - 1}], {n, 1, 10}] Flatten[%]
Formula
G.f.: 1/( - x^n + 1 - x^(1+n) + x + 3*x^(2+n) - 2*x^2 - x^(3+n) ).
Comments