Function: mftaylor
Section: modular_forms
C-Name: mftaylor
Prototype: GLD0,L,p
Help: mftaylor(F,n,{flreal=0}): F being a modular form in M_k(SL_2(Z)),
 computes the first n+1 canonical Taylor expansion of F around tau=I. If
 flreal=0, computes only an algebraic equivalence class. If flreal is set,
 compute p_n such that for tau close enough to I we have
 f(tau)=(2I/(tau+I))^ksum_{n>=0}p_n((tau-I)/(tau+I))^n.
Doc: $F$ being a form in $M_k(SL_2(\Bbb Z))$, computes the first $n+1$
 canonical Taylor expansion of $F$ around $\tau=I$. If \kbd{flreal=0},
 computes only an algebraic equivalence class. If \kbd{flreal} is set,
 compute $p_n$ such that for $\tau$ close enough to $I$ we have
 $$f(\tau)=(2I/(\tau+I))^k\sum_{n>=0}p_n((\tau-I)/(\tau+I))^n\;.$$
 \bprog
 ? D=mfDelta();
 ? mftaylor(D,8)
 %2 = [1/1728, 0, -1/20736, 0, 1/165888, 0, 1/497664, 0, -11/3981312]
 @eprog