Basic Polynomial Algebra Subprograms (BPAS)  v. 1.652
DenseUnivariateRationalPolynomial Member List

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

add(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomial
characteristic (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialstatic
coefficient(int k) constDenseUnivariateRationalPolynomialinlinevirtual
coefficients(int k=0) constDenseUnivariateRationalPolynomialinline
content() constDenseUnivariateRationalPolynomialinline
convertToExpressionTree() constDenseUnivariateRationalPolynomialvirtual
degree() constDenseUnivariateRationalPolynomialinline
DenseUnivariateRationalPolynomial()DenseUnivariateRationalPolynomialinline
DenseUnivariateRationalPolynomial(int s)DenseUnivariateRationalPolynomialinline
DenseUnivariateRationalPolynomial(const Integer &e)DenseUnivariateRationalPolynomialinline
DenseUnivariateRationalPolynomial(const RationalNumber &e) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
DenseUnivariateRationalPolynomial(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialinline
derivative(int k) constDenseUnivariateRationalPolynomialinlinevirtual
derivative() constDenseUnivariateRationalPolynomialinlinevirtual
differentiate(int k)DenseUnivariateRationalPolynomialvirtual
differentiate()DenseUnivariateRationalPolynomialinlinevirtual
diophantinEquationSolve(const DenseUnivariateRationalPolynomial &a, const DenseUnivariateRationalPolynomial &b, DenseUnivariateRationalPolynomial *s, DenseUnivariateRationalPolynomial *t) constDenseUnivariateRationalPolynomial
divideByVariableIfCan()DenseUnivariateRationalPolynomial
euclideanDivision(const DenseUnivariateRationalPolynomial &b, DenseUnivariateRationalPolynomial *q=NULL) constDenseUnivariateRationalPolynomialinlinevirtual
euclideanSize() constDenseUnivariateRationalPolynomialinlinevirtual
evaluate(const RationalNumber &x) constDenseUnivariateRationalPolynomialvirtual
evaluate(const Integer &x) constDenseUnivariateRationalPolynomial
evaluate(const LargerRing &x) constDenseUnivariateRationalPolynomialinline
extendedEuclidean(const DenseUnivariateRationalPolynomial &b, DenseUnivariateRationalPolynomial *s=NULL, DenseUnivariateRationalPolynomial *t=NULL) constDenseUnivariateRationalPolynomialinlinevirtual
gcd(const DenseUnivariateRationalPolynomial &q, int type) constDenseUnivariateRationalPolynomial
gcd(const DenseUnivariateRationalPolynomial &q) constDenseUnivariateRationalPolynomialinlinevirtual
halfExtendedEuclidean(const DenseUnivariateRationalPolynomial &b, DenseUnivariateRationalPolynomial *g) constDenseUnivariateRationalPolynomial
homothetic(int k=1)DenseUnivariateRationalPolynomial
integral() constDenseUnivariateRationalPolynomialinline
integrate()DenseUnivariateRationalPolynomial
isConstant() constDenseUnivariateRationalPolynomialinline
isConstantTermZero() constDenseUnivariateRationalPolynomial
isNegativeOne() constDenseUnivariateRationalPolynomialinline
isOne() constDenseUnivariateRationalPolynomialinlinevirtual
isZero() constDenseUnivariateRationalPolynomialinlinevirtual
lazyPseudoDivide(const DenseUnivariateRationalPolynomial &b, RationalNumber *c, RationalNumber *d=NULL)DenseUnivariateRationalPolynomialvirtual
lazyPseudoDivide(const DenseUnivariateRationalPolynomial &b, DenseUnivariateRationalPolynomial *rem, RationalNumber *c, RationalNumber *d) constDenseUnivariateRationalPolynomialvirtual
leadingCoefficient() constDenseUnivariateRationalPolynomialinline
monicDivide(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialvirtual
monicDivide(const DenseUnivariateRationalPolynomial &b, DenseUnivariateRationalPolynomial *rem) constDenseUnivariateRationalPolynomialvirtual
negate()DenseUnivariateRationalPolynomial
negativeOne()DenseUnivariateRationalPolynomialinline
negativeVariable()DenseUnivariateRationalPolynomial
numberOfSignChanges()DenseUnivariateRationalPolynomial
numberOfTerms() const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
one()DenseUnivariateRationalPolynomialinlinevirtual
operator!=(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialinlinevirtual
operator%(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialinlinevirtual
operator%=(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialinlinevirtual
operator*(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialvirtual
operator*(const RationalNumber &e) constDenseUnivariateRationalPolynomialinline
operator*(const mpq_class &e) const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator*(const sfixn &e) const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator* (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialfriend
operator* (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialfriend
operator*=(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialinlinevirtual
operator*=(const RationalNumber &e)DenseUnivariateRationalPolynomial
operator*=(const mpq_class &e) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomial
operator*=(const sfixn &e)DenseUnivariateRationalPolynomial
operator+(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialvirtual
operator+(const RationalNumber &c) constDenseUnivariateRationalPolynomialinline
operator+(const mpq_class &c) const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator+ (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialfriend
operator+=(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialinlinevirtual
operator+=(const RationalNumber &c)DenseUnivariateRationalPolynomialinline
operator+=(const mpq_class &c) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator-(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialvirtual
operator-() constDenseUnivariateRationalPolynomialvirtual
operator-(const RationalNumber &c) constDenseUnivariateRationalPolynomialinline
operator-(const mpq_class &c) const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator- (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialfriend
operator-=(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialinlinevirtual
operator-=(const RationalNumber &c)DenseUnivariateRationalPolynomialinline
operator-=(const mpq_class &c) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator/(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialinlinevirtual
operator/(const RationalNumber &e) constDenseUnivariateRationalPolynomialinline
operator/(const mpq_class &e) const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator/ (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialfriend
operator/=(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialvirtual
operator/=(const RationalNumber &e)DenseUnivariateRationalPolynomial
operator/=(const mpq_class &e) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomial
operator<<(int k) constDenseUnivariateRationalPolynomialvirtual
operator<<=(int k)DenseUnivariateRationalPolynomialinlinevirtual
operator=(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomialinlinevirtual
operator=(const RationalNumber &r) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
operator==(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialinlinevirtual
operator>>(int k) constDenseUnivariateRationalPolynomialvirtual
operator>>=(int k)DenseUnivariateRationalPolynomialinlinevirtual
operator^(long long int e) constDenseUnivariateRationalPolynomialvirtual
operator^=(long long int e)DenseUnivariateRationalPolynomialinlinevirtual
positiveRealRootIsolate(mpq_class width, int ts=-1)DenseUnivariateRationalPolynomialinline
positiveRealRootIsolate(mpq_class width, Intervals pIs, int ts=-1) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
primitivePart() const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
print(std::ostream &out) constDenseUnivariateRationalPolynomialvirtual
properties (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialstatic
pseudoDivide(const DenseUnivariateRationalPolynomial &b, RationalNumber *d=NULL)DenseUnivariateRationalPolynomialvirtual
pseudoDivide(const DenseUnivariateRationalPolynomial &b, DenseUnivariateRationalPolynomial *rem, RationalNumber *d) constDenseUnivariateRationalPolynomialvirtual
quotient(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialinlinevirtual
realRootIsolate(mpq_class width, int ts=-1)DenseUnivariateRationalPolynomialinline
reciprocal()DenseUnivariateRationalPolynomial
refineRoot(Interval *a, mpq_class width)DenseUnivariateRationalPolynomialinline
refineRoots(Intervals &a, mpq_class width)DenseUnivariateRationalPolynomialinline
remainder(const DenseUnivariateRationalPolynomial &b) constDenseUnivariateRationalPolynomialinlinevirtual
rootBound()DenseUnivariateRationalPolynomial
scaleTransform(int k)DenseUnivariateRationalPolynomial
setCoefficient(int k, const RationalNumber &value)DenseUnivariateRationalPolynomialinlinevirtual
setCoefficient(int k, double value) (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
setVariableName(const Symbol &x)DenseUnivariateRationalPolynomialinlinevirtual
squareFree() constDenseUnivariateRationalPolynomialvirtual
subtract(const DenseUnivariateRationalPolynomial &b)DenseUnivariateRationalPolynomial
taylorShift(int ts=-1)DenseUnivariateRationalPolynomial
trailingCoefficient() const (defined in DenseUnivariateRationalPolynomial)DenseUnivariateRationalPolynomialinline
unitCanonical(DenseUnivariateRationalPolynomial *u=NULL, DenseUnivariateRationalPolynomial *v=NULL) constDenseUnivariateRationalPolynomialinlinevirtual
variable() constDenseUnivariateRationalPolynomialinlinevirtual
zero()DenseUnivariateRationalPolynomialinlinevirtual
~DenseUnivariateRationalPolynomial()DenseUnivariateRationalPolynomialinline