Uses of Class
edu.jas.poly.PolynomialList
Packages that use PolynomialList
Package
Description
Groebner base application package.
Groebner bases using unique factorization package.
Generic coefficients polynomial package.
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Uses of PolynomialList in edu.jas.application
Fields in edu.jas.application declared as PolynomialListModifier and TypeFieldDescriptionprotected PolynomialList<GenPolynomial<C>> GroebnerSystem.cgbComprehensive Groebner base for this Groebner system.protected PolynomialList<C> Ideal.listThe data structure is a PolynomialList.protected PolynomialList<C> SolvableIdeal.listThe data structure is a PolynomialList.Methods in edu.jas.application that return PolynomialListModifier and TypeMethodDescriptionstatic <C extends GcdRingElem<C>>
PolynomialList<GenPolynomial<C>> PolyUtilApp.productSlice(PolynomialList<Product<Residue<C>>> L, int i) Product slice at i.Methods in edu.jas.application that return types with arguments of type PolynomialListModifier and TypeMethodDescriptionstatic <C extends GcdRingElem<C>>
Map<Ideal<C>, PolynomialList<GenPolynomial<C>>> PolyUtilApp.productSlice(PolynomialList<Product<Residue<C>>> L) Product slice.Methods in edu.jas.application with parameters of type PolynomialListModifier and TypeMethodDescriptionstatic <C extends GcdRingElem<C>>
Map<Ideal<C>, PolynomialList<GenPolynomial<C>>> PolyUtilApp.productSlice(PolynomialList<Product<Residue<C>>> L) Product slice.static <C extends GcdRingElem<C>>
PolynomialList<GenPolynomial<C>> PolyUtilApp.productSlice(PolynomialList<Product<Residue<C>>> L, int i) Product slice at i.static <C extends GcdRingElem<C>>
StringPolyUtilApp.productToString(PolynomialList<Product<Residue<C>>> L) Product slice to String.Method parameters in edu.jas.application with type arguments of type PolynomialListModifier and TypeMethodDescriptionstatic <C extends GcdRingElem<C>>
StringPolyUtilApp.productSliceToString(Map<Ideal<C>, PolynomialList<GenPolynomial<C>>> L) Product slice to String.Constructors in edu.jas.application with parameters of type PolynomialListModifierConstructorDescriptionIdeal(PolynomialList<C> list) Constructor.Ideal(PolynomialList<C> list, boolean gb) Constructor.Ideal(PolynomialList<C> list, boolean gb, boolean topt) Constructor.Ideal(PolynomialList<C> list, boolean gb, boolean topt, GroebnerBaseAbstract<C> bb) Constructor.Ideal(PolynomialList<C> list, boolean gb, boolean topt, GroebnerBaseAbstract<C> bb, Reduction<C> red) Constructor.Ideal(PolynomialList<C> list, boolean gb, GroebnerBaseAbstract<C> bb) Constructor.Ideal(PolynomialList<C> list, boolean gb, GroebnerBaseAbstract<C> bb, Reduction<C> red) Constructor.Ideal(PolynomialList<C> list, GroebnerBaseAbstract<C> bb, Reduction<C> red) Constructor.SolvableIdeal(PolynomialList<C> list) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, boolean topt) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, boolean topt, SolvableIdeal.Side s) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, boolean topt, SolvableGroebnerBaseAbstract<C> bb) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, boolean topt, SolvableGroebnerBaseAbstract<C> bb, SolvableReduction<C> red) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, boolean topt, SolvableGroebnerBaseAbstract<C> bb, SolvableReduction<C> red, SolvableIdeal.Side s) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, SolvableIdeal.Side s) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, SolvableGroebnerBaseAbstract<C> bb) Constructor.SolvableIdeal(PolynomialList<C> list, boolean gb, SolvableGroebnerBaseAbstract<C> bb, SolvableReduction<C> red) Constructor.SolvableIdeal(PolynomialList<C> list, SolvableGroebnerBaseAbstract<C> bb, SolvableReduction<C> red) Constructor. -
Uses of PolynomialList in edu.jas.gbufd
Methods in edu.jas.gbufd with parameters of type PolynomialListModifier and TypeMethodDescriptionSolvableSyzygy.resolution(PolynomialList<C> F) Resolution of a polynomial list.SolvableSyzygySeq.resolution(PolynomialList<C> F) Resolution of a polynomial list.Syzygy.resolution(PolynomialList<C> F) Resolution of a polynomial list.SyzygySeq.resolution(PolynomialList<C> F) Resolution of a polynomial list.SolvableSyzygy.resolutionArbitrary(PolynomialList<C> F) Resolution of a polynomial list.SolvableSyzygySeq.resolutionArbitrary(PolynomialList<C> F) Resolution of a polynomial list.Syzygy.resolutionArbitrary(PolynomialList<C> F) Resolution of a polynomial list.SyzygySeq.resolutionArbitrary(PolynomialList<C> F) Resolution of a polynomial list. -
Uses of PolynomialList in edu.jas.poly
Subclasses of PolynomialList in edu.jas.polyModifier and TypeClassDescriptionclassOptimizedPolynomialList<C extends RingElem<C>>Container for optimization results.classOrderedPolynomialList<C extends RingElem<C>>Ordered list of polynomials.Classes in edu.jas.poly that implement interfaces with type arguments of type PolynomialListModifier and TypeClassDescriptionclassPolynomialList<C extends RingElem<C>>List of polynomials.Methods in edu.jas.poly that return PolynomialListModifier and TypeMethodDescriptionPolynomialList.copy()Copy this.PolynomialList.deHomogenize()Dehomogenize.ModuleList.getPolynomialList()Get PolynomialList.ModuleList.getPolynomialList(boolean top) Get PolynomialList.ModuleList.getPolynomialList(GenPolynomialRing<C> pfac) Get PolynomialList.PolynomialList.homogenize()Make homogeneous.GenPolynomialTokenizer.nextPolynomialSet()Parsing method for polynomial set.GenPolynomialTokenizer.nextSolvablePolynomialSet()Parsing method for solvable polynomial set.Methods in edu.jas.poly with parameters of type PolynomialListModifier and TypeMethodDescriptionintPolynomialList.compareTo(PolynomialList<C> L) Polynomial list comparison.static <C extends RingElem<C>>
OptimizedPolynomialList<C> TermOrderOptimization.optimizeTermOrder(PolynomialList<C> P) Optimize variable order.static <C extends RingElem<C>>
OptimizedPolynomialList<GenPolynomial<C>> TermOrderOptimization.optimizeTermOrderOnCoefficients(PolynomialList<GenPolynomial<C>> P) Optimize variable order on coefficients.