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URL: https://oeis.org/A157394

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A157394
A partition product of Stirling_1 type [parameter k = 4] with biggest-part statistic (triangle read by rows).
12
1, 1, 4, 1, 12, 12, 1, 72, 48, 24, 1, 280, 600, 120, 24, 1, 1740, 4560, 1800, 144, 0, 1, 8484, 40740, 21000, 2520, 0, 0, 1, 57232, 390432, 223440, 33600, 0, 0, 0, 1, 328752, 3811248, 2845584, 438480, 0, 0, 0, 0, 1, 2389140
OFFSET
1,3
COMMENTS
Partition product of prod_{j=0..n-2}(k-n+j+2) and n! at k = 4,
summed over parts with equal biggest part (see the Luschny link).
Underlying partition triangle is A144878.
Same partition product with length statistic is A049424.
Diagonal a(A000217(n)) = falling_factorial(4,n-1), row in A008279
Row sum is A049427.
FORMULA
T(n,0) = [n = 0] (Iverson notation) and for n > 0 and 1 <= m <= n
T(n,m) = Sum_{a} M(a)|f^a| where a = a_1,..,a_n such that
1*a_1+2*a_2+...+n*a_n = n and max{a_i} = m, M(a) = n!/(a_1!*..*a_n!),
f^a = (f_1/1!)^a_1*..*(f_n/n!)^a_n and f_n = product_{j=0..n-2}(j-n+6).
EXAMPLE
1
1 4
1 12 12
1 72 48 24
1 280 600 120 24
1 1740 4560 1800 144 0
1 8484 40740 21000 2520 0 0
1 57232 390432 223440 33600 0 0 0
1 328752 3811248 2845584 438480 0 0 0 0
1 2389140
KEYWORD
easy,nonn,tabl
AUTHOR
Peter Luschny, Mar 07 2009, Mar 14 2009
STATUS
approved