Uses of Class
edu.jas.application.IdealWithUniv
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Packages that use IdealWithUniv Package Description edu.jas.application Groebner base application package. -
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Uses of IdealWithUniv in edu.jas.application
Subclasses of IdealWithUniv in edu.jas.application Modifier and Type Class Description classIdealWithComplexAlgebraicRoots<D extends GcdRingElem<D> & Rational>Container for Ideals together with univariate polynomials and complex algebraic roots.(package private) classIdealWithComplexRoots<C extends GcdRingElem<C>>Container for Ideals together with univariate polynomials and complex roots.classIdealWithRealAlgebraicRoots<D extends GcdRingElem<D> & Rational>Container for Ideals together with univariate polynomials and real algebraic roots.classIdealWithRealRoots<C extends GcdRingElem<C>>Container for Ideals together with univariate polynomials and real roots.Fields in edu.jas.application declared as IdealWithUniv Modifier and Type Field Description IdealWithUniv<C>PrimaryComponent. primeThe associated prime ideal.(package private) IdealWithUniv<C>RealAlgebraicRing. univsRepresenting ideal with univariate polynomials IdealWithUniv.Methods in edu.jas.application that return IdealWithUniv Modifier and Type Method Description static <C extends GcdRingElem<C>>
IdealWithUniv<C>Ideal. contraction(IdealWithUniv<Quotient<C>> eid)Ideal contraction.IdealWithUniv<Quotient<C>>Ideal. extension(GenPolynomialRing<C> efac)Ideal extension.IdealWithUniv<Quotient<C>>Ideal. extension(QuotientRing<C> qfac)Ideal extension.IdealWithUniv<Quotient<C>>Ideal. extension(java.lang.String... vars)Ideal extension.IdealWithUniv<C>Ideal. normalPositionFor(int i, int j, java.util.List<GenPolynomial<C>> og)Compute normal position for variables i and j.(package private) IdealWithUniv<C>Ideal. normalPositionForChar0(int i, int j, java.util.List<GenPolynomial<C>> og)Compute normal position for variables i and j, characteristic zero.(package private) IdealWithUniv<C>Ideal. normalPositionForCharP(int i, int j, java.util.List<GenPolynomial<C>> og)Compute normal position for variables i and j, positive characteristic.IdealWithUniv<C>Ideal. permContraction(IdealWithUniv<Quotient<C>> eideal)Ideal contraction and permutation.static <C extends GcdRingElem<C>>
IdealWithUniv<C>Ideal. permutation(GenPolynomialRing<C> oring, IdealWithUniv<C> Cont)Ideal permutation.Methods in edu.jas.application that return types with arguments of type IdealWithUniv Modifier and Type Method Description java.util.List<IdealWithUniv<C>>Ideal. decomposition()Ideal irreducible decomposition.java.util.List<IdealWithUniv<C>>Ideal. primeDecomposition()Ideal prime decomposition.java.util.List<IdealWithUniv<C>>Ideal. radicalDecomposition()Ideal radical decomposition.java.util.List<IdealWithUniv<C>>Ideal. zeroDimDecomposition()Zero dimensional ideal irreducible decomposition.java.util.List<IdealWithUniv<C>>Ideal. zeroDimDecompositionExtension(java.util.List<GenPolynomial<C>> upol, java.util.List<GenPolynomial<C>> og)Zero dimensional ideal irreducible decomposition extension.java.util.List<IdealWithUniv<C>>Ideal. zeroDimElimination(java.util.List<IdealWithUniv<C>> pdec)Zero dimensional ideal elimination to original ring.java.util.List<IdealWithUniv<C>>Ideal. zeroDimPrimeDecomposition()Zero dimensional ideal prime decomposition.java.util.List<IdealWithUniv<C>>Ideal. zeroDimPrimeDecompositionFE()Zero dimensional ideal prime decomposition, with field extension.java.util.List<IdealWithUniv<C>>Ideal. zeroDimRadicalDecomposition()Zero dimensional radical decomposition.java.util.List<IdealWithUniv<C>>Ideal. zeroDimRootDecomposition()Zero dimensional ideal decomposition for real roots.Methods in edu.jas.application with parameters of type IdealWithUniv Modifier and Type Method Description static <D extends GcdRingElem<D> & Rational>
IdealWithComplexAlgebraicRoots<D>PolyUtilApp. complexAlgebraicRoots(IdealWithUniv<D> I)Construct complex roots for zero dimensional ideal(G).static <C extends GcdRingElem<C>>
IdealWithUniv<C>Ideal. contraction(IdealWithUniv<Quotient<C>> eid)Ideal contraction.booleanIdeal. isRadical(IdealWithUniv<C> ru)Test for radical ideal.IdealWithUniv<C>Ideal. permContraction(IdealWithUniv<Quotient<C>> eideal)Ideal contraction and permutation.static <C extends GcdRingElem<C>>
IdealWithUniv<C>Ideal. permutation(GenPolynomialRing<C> oring, IdealWithUniv<C> Cont)Ideal permutation.static <D extends GcdRingElem<D> & Rational>
IdealWithRealAlgebraicRoots<D>PolyUtilApp. realAlgebraicRoots(IdealWithUniv<D> I)Construct real roots for zero dimensional ideal(G).Method parameters in edu.jas.application with type arguments of type IdealWithUniv Modifier and Type Method Description static <C extends GcdRingElem<C>>
java.util.List<Ideal<C>>IdealWithUniv. asListOfIdeals(java.util.List<IdealWithUniv<C>> Bl)Get list of ideals from list of ideals with univariates.static <D extends GcdRingElem<D> & Rational>
java.util.List<IdealWithComplexAlgebraicRoots<D>>PolyUtilApp. complexAlgebraicRoots(java.util.List<IdealWithUniv<D>> I)Construct complex roots for zero dimensional ideal(G).static <D extends GcdRingElem<D> & Rational>
java.util.List<IdealWithComplexRoots<D>>PolyUtilApp. complexRoots(java.util.List<IdealWithUniv<D>> Il, BigRational eps)Construct superset of complex roots for zero dimensional ideal(G).static <D extends GcdRingElem<D> & Rational>
java.util.List<java.util.List<Complex<BigDecimal>>>PolyUtilApp. complexRootTuples(java.util.List<IdealWithUniv<D>> Il, BigRational eps)Construct superset of complex roots for zero dimensional ideal(G).booleanIdeal. isDecomposition(java.util.List<IdealWithUniv<C>> L)Test for ideal decomposition.booleanIdeal. isZeroDimDecomposition(java.util.List<IdealWithUniv<C>> L)Test for zero dimensional ideal decomposition.static <D extends GcdRingElem<D> & Rational>
java.util.List<IdealWithRealAlgebraicRoots<D>>PolyUtilApp. realAlgebraicRoots(java.util.List<IdealWithUniv<D>> I)Construct real roots for zero dimensional ideal(G).static <D extends GcdRingElem<D> & Rational>
java.util.List<IdealWithRealRoots<D>>PolyUtilApp. realRoots(java.util.List<IdealWithUniv<D>> Il, BigRational eps)Construct superset of real roots for zero dimensional ideal(G).static <D extends GcdRingElem<D> & Rational>
java.util.List<java.util.List<BigDecimal>>PolyUtilApp. realRootTuples(java.util.List<IdealWithUniv<D>> Il, BigRational eps)Construct superset of real roots for zero dimensional ideal(G).java.util.List<IdealWithUniv<C>>Ideal. zeroDimElimination(java.util.List<IdealWithUniv<C>> pdec)Zero dimensional ideal elimination to original ring.java.util.List<PrimaryComponent<C>>Ideal. zeroDimPrimaryDecomposition(java.util.List<IdealWithUniv<C>> pdec)Zero dimensional ideal primary decomposition.Constructors in edu.jas.application with parameters of type IdealWithUniv Constructor Description IdealWithComplexAlgebraicRoots(IdealWithUniv<D> iu, java.util.List<java.util.List<Complex<RealAlgebraicNumber<D>>>> cr)Constructor.IdealWithComplexRoots(IdealWithUniv<C> iu, java.util.List<java.util.List<Complex<BigDecimal>>> cr)Constructor.IdealWithRealAlgebraicRoots(IdealWithUniv<D> iu, java.util.List<java.util.List<RealAlgebraicNumber<D>>> rr)Constructor.IdealWithRealRoots(IdealWithUniv<C> iu, java.util.List<java.util.List<BigDecimal>> rr)Constructor.PrimaryComponent(Ideal<C> q, IdealWithUniv<C> p)Constructor.PrimaryComponent(Ideal<C> q, IdealWithUniv<C> p, int e)Constructor.RealAlgebraicRing(IdealWithUniv<C> m, ResidueRing<C> a, RealRootTuple<C> r)The constructor creates a RealAlgebraicNumber factory object from a IdealWithUniv, ResidueRing and a root tuple.RealAlgebraicRing(IdealWithUniv<C> m, RealRootTuple<C> root)The constructor creates a RealAlgebraicNumber factory object from a IdealWithUniv and a root tuple.RealAlgebraicRing(IdealWithUniv<C> m, RealRootTuple<C> root, boolean isField)The constructor creates a RealAlgebraicNumber factory object from a IdealWithUniv and a root tuple.
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