Function: seralgdep
Section: polynomials
C-Name: seralgdep
Prototype: GLL
Help: seralgdep(s,p,r): find a linear relation between powers (1,s, ..., s^p)
 of the series s, with polynomial coefficients of degree <= r.
Doc: \sidx{algebraic dependence} finds a linear relation between powers $(1,s,
 \dots, s^{p})$ of the series $s$, with polynomial coefficients of degree
 $\leq r$. In case no relation is found, return $0$.
 \bprog
 ? s = 1 + 10*y - 46*y^2 + 460*y^3 - 5658*y^4 + 77740*y^5 + O(y^6);
 ? seralgdep(s, 2, 2)
 %2 = -x^2 + (8*y^2 + 20*y + 1)
 ? subst(%, x, s)
 %3 = O(y^6)
 ? seralgdep(s, 1, 3)
 %4 = (-77*y^2 - 20*y - 1)*x + (310*y^3 + 231*y^2 + 30*y + 1)
 ? seralgdep(s, 1, 2)
 %5 = 0
 @eprog\noindent The series main variable must not be $x$, so as to be able
 to express the result as a polynomial in $x$.
