0,5

A variant of A008288 (they satsify the same recurrence).

P[n](x) = (x+1) * ( ((x+1+sqrt(x^2+6x+1))/2)^n - ((x+1-sqrt(x^2+6x+1))/2)^n ) / sqrt(x^2+6x+1) - Max Alekseyev (maxale(AT)gmail.com), Mar 10 2008

P[n](x) = (x+1) * (sqrt(x)*I)^(n-1) * U[n-1](-I*(x+1)/sqrt(x)/2), where U[n](t) is Chebyshev polynomial of the 2nd kind. - Max Alekseyev (maxale(AT)gmail.com), Mar 10 2008

Triangle begins:

0

1, 1

1, 2, 1

1, 4, 4, 1

1, 6, 10, 6, 1

1, 8, 20, 20, 8, 1

1, 10, 34, 50, 34, 10, 1

1, 12, 52, 104, 104, 52, 12, 1

1, 14, 74, 190, 258, 190, 74, 14, 1

1, 16, 100, 316, 552, 552, 316, 100, 16, 1

P[0]:=0;

P[1]:=x+1;

for n from 2 to 14 do

P[n]:=expand((x+1)*P[n-1]+x*P[n-2]);

lprint(P[n]);

lprint(seriestolist(series(P[n], x, 200)));

od:

(PARI) { T(n, k) = sum(m=0, (n-1)\2, binomial(n, 2*m+1) * sum(j=0, m, binomial(m, j) * binomial(n-2*j, k-j) * 2^(2*j+1-n) ) ) } - Max Alekseyev (maxale(AT)gmail.com), Mar 10 2008

Sequence in context: A156580 A157528 A132731 this_sequence A055907 A096806 A116672

Adjacent sequences: A128963 A128964 A128965 this_sequence A128967 A128968 A128969

nonn,tabl

N. J. A. Sloane (njas(AT)research.att.com), May 10 2007