CGAL 4.11.3 - Polynomial
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Note: This functor is optional!
Computes the principal subresultant of two polynomials \( p\) and \( q\) of type PolynomialTraits_d::Coefficient_type
with respect to the outermost variable. The \( i\)-th principal subresultant, \( \mathrm{sres}_i(p,q)\), is defined as the coefficient at \( t^i\) of the \( i\)-th polynomial subresultant \( \mathrm{Sres}_i(p,q)\). Thus, it is either the leading coefficient of \( \mathrm{Sres}_i\), or zero in the case where its degree is below \( i\).
The result is written in an output range, starting with the \( 0\)-th principal subresultant \( \mathrm{sres}_0(p,q)\) ,aka as the resultant of \( p\) and \( q\). (Note that \( \mathrm{sres}_0(p,q)=\mathrm{Sres}_0(p,q)\) by definition)
Operations | |
template<typename OutputIterator > | |
OutputIterator | operator() (Polynomial_d p, Polynomial_d q, OutputIterator out) |
computes the principal subresultants of \( p\) and \( q\), with respect to the outermost variable. More... | |
template<typename OutputIterator > | |
OutputIterator | operator() (Polynomial_d p, Polynomial_d q, OutputIterator out, int i) |
computes the principal subresultants of \( p\) and \( q\), with respect to the variable \( x_i\). | |
OutputIterator PolynomialTraits_d::PrincipalSubresultants::operator() | ( | Polynomial_d | p, |
Polynomial_d | q, | ||
OutputIterator | out | ||
) |
computes the principal subresultants of \( p\) and \( q\), with respect to the outermost variable.
Each element is of type PolynomialTraits_d::Coefficient_type
.