0,1

Row sums are:

{2, 8, 62, 680, 9518, 161804, 3236078, 74429792, 1935174590, 56120063108,...}.

The sequence comes from a generalization of the recurrence for A008517.

Weisstein, Eric W. "Second-Order Eulerian Triangle." http://mathworld.wolfram.com/Second-OrderEulerianTriangle.html

m=3; e(n,k,n)=(k + m - 1)*e(n - 1, k, m) + (m*n - k + 1 - m)*e(n - 1, k - 1, m);

t(n,k)=e(n,k,m)+e(n,n-k,m).

{2},

{1, 1},

{1, 6, 1},

{1, 30, 30, 1},

{1, 159, 360, 159, 1},

{1, 1119, 3639, 3639, 1119, 1},

{1, 10932, 41262, 57414, 41262, 10932, 1},

{1, 136764, 582642, 898632, 898632, 582642, 136764, 1},

{1, 2031933, 9957168, 16634718, 17182152, 16634718, 9957168, 2031933, 1},

{1, 34474173, 194894781, 369132246, 369086094, 369086094, 369132246, 194894781, 34474173, 1},

{1, 654773346, 4228768422, 9285005715, 9780535908, 8221896324, 9780535908, 9285005715, 4228768422, 654773346, 1}

m = 3; e[n_, 0, m_] := 1;

e[n_, k_, m_] := 0 /; k >= n;

e[n_, k_, 1] := 1 /; k >= n;

e[n_, k_, m_] := (k + m - 1)e[n - 1, k, m] + (m*n - k + 1 - m)e[n - 1, k - 1, m];

Table[Table[e[n, k, m], {k, 0, n - 1}], {n, 1, 10}];

Table[Table[e[n, k, m] + e[n, n - k, m], {k, 0, n}], {n, 0, 10}];

Flatten[%]

A054091, A054090, A008517, A156141

Sequence in context: A054387 A112734 A157118 this_sequence A156233 A060185 A129110

Adjacent sequences: A156183 A156184 A156185 this_sequence A156187 A156188 A156189

nonn,tabl,uned

Roger L. Bagula (rlbagulatftn(AT)yahoo.com), Feb 05 2009