0,3

The sequence is 0,0,0,1,0,4,0,14,0,...with zeros restored. Second binomial transform of (-1)^n*A003518(n). Second binomial transform of expansion of x^3c(-x)^8, where c(x) is g.f. of A000108. The g.f. is transformed to x^3 under the Chebyshev transformation A(x)->(1/(1+x^2))A(x/(1+x^2)). For a sequence b(n), this corresponds to taking sum{k=0..floor(n/2), C(n-k,k)(-1)^k*b(n-2k)}, or sum{k=0..n, C((n+k)/2,k)b(k)(-1)^((n-k)/2)(1+(-1)^(n-k))/2}.

G.f.: (1-2x)^4(sqrt((1+2x)/(1-2x))-1)^8/(256x^5); a(n)=sum{k=0..n, (k+1)C(n, (n-k)/2)(-1)^k(C(3, k)-3C(2, k)+3C(1, k)-C(0, k))(1+(-1)^(n-k))/(n+k+2)}.

a(n)=A002057(n-1). - Michael Somos Jul 31 2005

Given an ellipse with eccentricity e and major and minor axis a and b respectively, then ((a-b)/ (a+b))^2 = 1*(e/2)^4 +4*(e/2)^6 +14*(e/2)^8 +48*(e/2)^10 +... - Michael Somos Apr 11 2007

E.g.f.: exp(2x)(Bessel_I(1,2x)-Bessel_I(3,2x)); - Paul Barry (pbarry(AT)wit.ie), Jun 04 2007

(PARI) {a(n)= if(n<1, 0, n++; 2* binomial(2*n, n-2)/n)} /* Michael Somos Apr 11 2007 */

Cf. A003518, A000245.

Adjacent sequences: A099373 A099374 A099375 this_sequence A099377 A099378 A099379

Sequence in context: A094827 A094667 A002057 this_sequence A047048 A071745 A071749

easy,nonn

Paul Barry (pbarry(AT)wit.ie), Oct 13 2004