A182309 - OEIS

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A182309

Triangle T(n,k) with 2 <= k <= floor(2(n+1)/3) gives the number of length-n binary sequences with exactly k zeros and with length two for the longest run of zeros.

1, 2, 3, 2, 4, 6, 1, 5, 12, 6, 6, 20, 18, 3, 7, 30, 40, 16, 1, 8, 42, 75, 50, 10, 9, 56, 126, 120, 45, 4, 10, 72, 196, 245, 140, 30, 1, 11, 90, 288, 448, 350, 126, 15, 12, 110, 405, 756, 756, 392, 90, 5, 13, 132, 550, 1200, 1470, 1008, 357, 50, 1, 14, 156, 726

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OFFSET

2,2

COMMENTS

Triangle T(n,k) captures several well known sequences. In particular, T(n,2)=(n-1), the natural numbers; T(n,3)=(n-2)(n-3)=A002378(n-3), the "oblong" numbers; T(n,4)=(n-3)(n-4)^2/2=A002411(n-4), "pentagonal pyramidal" numbers; and also T(n,5)=(n-4)C(n-4,3)=A004320(n-6). Furthermore, row sums=A000100(n+1).

LINKS

Table of n, a(n) for n=2..65.

Dennis Walsh, Notes on binary sequences with a maximum run length of two

FORMULA

T(n,k) = Sum_{j=1..k/2} binomial(n-k+1,j)*binomial(n-k-j+1,k-2j) for 2 <= k <= 2(n+1)/3.

EXAMPLE

For n=6 and k=3, T(6,3)=12 since there are 12 binary sequences of length 6 that contain 3 zeros and that have a maximum run of zeros of length 2, namely, 011100, 101100, 110100, 011001, 101001, 110010, 010011, 100110, 100101, 001110, 001101, and 001011.

Triangle T(n,k) begins

3, 2,

4, 6, 1,

5, 12, 6,

6, 20, 18, 3,

7, 30, 40, 16, 1,

8, 42, 75, 50, 10,

9, 56, 126, 120, 45, 4,

10, 72, 196, 245, 140, 30, 1,

11, 90, 288, 448, 350, 126, 15,

12, 110, 405, 756, 756, 392, 90, 5,

13, 132, 550, 1200, 1470, 1008, 357, 50, 1,

14, 156, 726, 1815, 2640, 2268, 1106, 266, 21,

15, 182, 936, 2640, 4455, 4620, 2898, 1016, 161, 6,

MAPLE

seq(seq(sum(binomial(n-k+1, j)*binomial(n-k+1-j, k-2*j), j=1..floor(k/2)), k=2..floor(2*(n+1)/3)), n=2..20);

MATHEMATICA

t[n_, k_] := Sum[ Binomial[n-k+1, j]*Binomial[n-k-j+1, k-2*j], {j, 1, k/2}]; Table[t[n, k], {n, 2, 15}, {k, 2, 2*(n+1)/3}] // Flatten (* Jean-François Alcover, Jun 06 2013 *)

CROSSREFS

Row sums of triangle T(n,k)=A000100(n+1);

T(n,3)=A002378(n-3); T(n,4)=A002411(n-4);

T(n,5)=A004320(n-6).

Sequence in context: A325349 A320054 A215228 * A043263 A321326 A118978

Adjacent sequences: A182306 A182307 A182308 * A182310 A182311 A182312

KEYWORD

nonn,nice,easy,tabf

AUTHOR

Dennis P. Walsh, Apr 23 2012

STATUS

approved