-1,2

Expansion of (eta(q^2)* eta(q^4)/( eta(q)* eta(q^8) ))^8 in powers of q.

Euler transform of period 8 sequence [ 8, 0, 8, -8, 8, 0, 8, 0, ...].

G.f. A(x) satisfies 0= f(A(x), A(x^2), A(x^4)) where f(u, v, w)= 16* (1-v*w)* (1-v*u) -(v-u^2)* (v-w^2).

G.f. is Fourier series of a weight 0 level 8 modular form. f(-1/(8 t)) = f(t) where q = exp(2 pi i t).

1/q + 8 + 36*q + 128*q^2 + 386*q^3 + 1024*q^4 + 2488*q^5 + 5632*q^6 + ...

(PARI) {a(n)= local(A); if(n<-1, 0, n++; A= x*O(x^n); polcoeff( (eta(x^2+A) *eta(x^4+A)/ eta(x+A)/ eta(x^8+A))^8, n))}

A007265(n)= a(n) unless n=0.

Sequence in context: A145136 A144901 A054470 this_sequence A055910 A022573 A014477

Adjacent sequences: A131120 A131121 A131122 this_sequence A131124 A131125 A131126

nonn

Michael Somos, Jun 15 2007