Basic Polynomial Algebra Subprograms (BPAS)  v. 1.791
ComplexRationalNumber Member List

This is the complete list of members for ComplexRationalNumber, including all inherited members.

ComplexRationalNumber() (defined in ComplexRationalNumber)ComplexRationalNumber
ComplexRationalNumber(const mpq_class &_a, const mpq_class &_b=mpq_class(1)) (defined in ComplexRationalNumber)ComplexRationalNumber
ComplexRationalNumber(const ComplexRationalNumber &c) (defined in ComplexRationalNumber)ComplexRationalNumber
ComplexRationalNumber(int _a, int _b=1, int _c=0, int _d=1) (defined in ComplexRationalNumber)ComplexRationalNumber
ComplexRationalNumber(const Integer &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const RationalNumber &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const SmallPrimeField &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const BigPrimeField &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const GeneralizedFermatPrimeField &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const DenseUnivariateIntegerPolynomial &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const DenseUnivariateRationalPolynomial &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const SparseUnivariatePolynomial< Integer > &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const SparseUnivariatePolynomial< RationalNumber > &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const SparseUnivariatePolynomial< ComplexRationalNumber > &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
ComplexRationalNumber(const SparseUnivariatePolynomial< Ring > &c) (defined in ComplexRationalNumber)ComplexRationalNumberexplicit
conjugate() const (defined in ComplexRationalNumber)ComplexRationalNumberinline
convertToExpressionTree() constComplexRationalNumberinlinevirtual
euclideanDivision(const ComplexRationalNumber &b, ComplexRationalNumber *q=NULL) constComplexRationalNumbervirtual
euclideanSize() constComplexRationalNumberinlinevirtual
extendedEuclidean(const ComplexRationalNumber &b, ComplexRationalNumber *s=NULL, ComplexRationalNumber *t=NULL) constComplexRationalNumbervirtual
gcd(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
imaginaryPart() const (defined in ComplexRationalNumber)ComplexRationalNumberinline
inverse() constComplexRationalNumberinlinevirtual
isConstant() constComplexRationalNumberinline
isNegativeOne() constComplexRationalNumberinline
isOne() constComplexRationalNumberinlinevirtual
isZero() constComplexRationalNumberinlinevirtual
negativeOne()ComplexRationalNumberinline
one()ComplexRationalNumberinlinevirtual
operator!=(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
operator!=(const mpq_class &k) const (defined in ComplexRationalNumber)ComplexRationalNumberinline
operator!=(int k) const (defined in ComplexRationalNumber)ComplexRationalNumberinline
operator%(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
operator%=(const ComplexRationalNumber &c)ComplexRationalNumberinlinevirtual
operator*(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
operator*=(const ComplexRationalNumber &c)ComplexRationalNumberinlinevirtual
operator*=(const mpq_class &c) (defined in ComplexRationalNumber)ComplexRationalNumberinline
operator*=(int c) (defined in ComplexRationalNumber)ComplexRationalNumberinline
operator+(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
operator+=(const ComplexRationalNumber &c)ComplexRationalNumberinlinevirtual
operator-(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
operator-() constComplexRationalNumberinlinevirtual
operator-=(const ComplexRationalNumber &c)ComplexRationalNumberinlinevirtual
operator/(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
operator/=(const ComplexRationalNumber &c)ComplexRationalNumberinlinevirtual
operator=(const ComplexRationalNumber &c)ComplexRationalNumbervirtual
operator=(const mpq_class &k) (defined in ComplexRationalNumber)ComplexRationalNumber
operator=(int k) (defined in ComplexRationalNumber)ComplexRationalNumber
operator==(const ComplexRationalNumber &c) constComplexRationalNumberinlinevirtual
operator==(const mpq_class &k) const (defined in ComplexRationalNumber)ComplexRationalNumberinline
operator==(int k) const (defined in ComplexRationalNumber)ComplexRationalNumberinline
operator^(long long int e) constComplexRationalNumberinlinevirtual
operator^=(long long int e)ComplexRationalNumberinlinevirtual
print(std::ostream &out) constComplexRationalNumbervirtual
quotient(const ComplexRationalNumber &b) constComplexRationalNumbervirtual
realPart() const (defined in ComplexRationalNumber)ComplexRationalNumberinline
remainder(const ComplexRationalNumber &b) constComplexRationalNumbervirtual
set(const RationalNumber &ka, const RationalNumber &kb) (defined in ComplexRationalNumber)ComplexRationalNumber
set(const mpq_class &ka, const mpq_class &kb) (defined in ComplexRationalNumber)ComplexRationalNumber
set(const mpq_class &ka, int kb) (defined in ComplexRationalNumber)ComplexRationalNumber
set(int ka, const mpq_class &kb) (defined in ComplexRationalNumber)ComplexRationalNumber
set(int ka, int kb) (defined in ComplexRationalNumber)ComplexRationalNumber
setImaginaryPart(const RationalNumber &r) (defined in ComplexRationalNumber)ComplexRationalNumber
setImaginaryPart(const mpq_class &k) (defined in ComplexRationalNumber)ComplexRationalNumber
setImaginaryPart(int k) (defined in ComplexRationalNumber)ComplexRationalNumber
setRealPart(const RationalNumber &r) (defined in ComplexRationalNumber)ComplexRationalNumber
setRealPart(const mpq_class &k) (defined in ComplexRationalNumber)ComplexRationalNumber
setRealPart(int k) (defined in ComplexRationalNumber)ComplexRationalNumber
squareFree() constComplexRationalNumberinlinevirtual
unitCanonical(ComplexRationalNumber *u=NULL, ComplexRationalNumber *v=NULL) constComplexRationalNumbervirtual
zero()ComplexRationalNumberinlinevirtual