AlgebraicIntegrate2(R0, F, UP, UPUP, R)¶
intpar.spad line 1422 [edit on github]
R0: Join(Comparable, IntegralDomain, RetractableTo Integer)
F: Join(AlgebraicallyClosedField, FunctionSpace R0)
UPUP: UnivariatePolynomialCategory Fraction UP
R: FunctionFieldCategory(F, UP, UPUP)
undocumented
- algextint: (UP -> UP, List Fraction UP -> List Record(ratpart: Fraction UP, coeffs: Vector F), (Fraction UP, List Fraction UP) -> List Record(ratpart: Fraction UP, coeffs: Vector F), Matrix F -> List Vector F, List R) -> List Record(ratpart: R, coeffs: Vector F)
algextint(der, ext, rde, csolve, [g1, ..., gn])returns a basis of solutions of the homogeneous systemh' + c1*g1 + ... + cn*gn = 0. Argumentextis an extended integration function onF,rdeis RDE solver,csolveis linear solver over constants.
- algextint_base: (UP -> UP, Matrix F -> List Vector F, List R) -> List Record(ratpart: R, coeffs: Vector F)
algextint_base(der, csolve, [g1, ..., gn])is like algextint(der, ext, rde,csolve, [g1, …,gn]), but assumes that field is algebraic extension of rational functions and thatgi-shave no poles at infinity.