1,14

Also number of partitions of n in which all integers smaller than the largest part occur and have k parts smaller than the largest part (n>=1, k>=0). Row 1 has one term; rows j (j>=2) have j-1 terms. Row sums yield A000009. sum(k*T(n,k),k=0..n-2)=A117455(n).

Table of n, a(n) for n=1..105.

G.f.=G(t,x)=sum(t^(i-1)*x^(i(i+1)/2)/[(1-x^i)product(1-tx^j, j=1..i-1)], i=1..infinity).

T(12,5)=3 because we have [7,3,2],[6,5,1] and [6,3,2,1].

Triangle starts:

1;

1;

1,1;

1,0,1;

1,1,0,1;

1,0,2,0,1;

g:=sum(t^(i-1)*x^(i*(i+1)/2)/(1-x^i)/product(1-t*x^j, j=1..i-1), i=1..20): gser:=simplify(series(g, x=0, 20)): for n from 1 to 16 do P[n]:=coeff(gser, x^n) od: 1; for n from 2 to 16 do seq(coeff(P[n], t, j), j=0..n-2) od; # yields sequence in triangular form

z = 20; d[n_] := d[n] = Select[IntegerPartitions[n], DeleteDuplicates[#] == # &]; p[n_, k_] := p[n, k] = d[n][[k]]; t = Table[Max[p[n, k]] - Min[p[n, k]], {n, 1, z}, {k, 1, PartitionsQ[n]}]; u = Table[Count[t[[n]], k], {n, 1, z}, {k, 0, n - 2}];

TableForm[u] (* A117454 as an array *)

Flatten[u]   (* A117454 as a sequence *)

(* Clark Kimberling, Mar 14 2014 *)

Cf. A000009, A117455.

Sequence in context: A129691 A280750 A280748 * A115357 A171182 A333806

Adjacent sequences:  A117451 A117452 A117453 * A117455 A117456 A117457

nonn,tabf

Emeric Deutsch, Mar 18 2006

approved