SegreClasses : Index
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chowClass -- Finds the (fundamental) class of a subscheme in the Chow ring of the ambient space
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chowClass(Ideal) -- Finds the (fundamental) class of a subscheme in the Chow ring of the ambient space
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chowClass(Ideal,QuotientRing) -- Finds the (fundamental) class of a subscheme in the Chow ring of the ambient space
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containedInSingularLocus -- This method tests is an irreducible variety is contained in the singular locus of the reduced scheme of an irreducible scheme
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containedInSingularLocus(Ideal,Ideal) -- This method tests is an irreducible variety is contained in the singular locus of the reduced scheme of an irreducible scheme
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intersectionProduct -- A class in the Chow ring of the ambient space representing the Fulton-MacPherson intersection product of two schemes inside a variety
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intersectionProduct(Ideal,Ideal,Ideal) -- A class in the Chow ring of the ambient space representing the Fulton-MacPherson intersection product of two schemes inside a variety
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intersectionProduct(Ideal,Ideal,Ideal,QuotientRing) -- A class in the Chow ring of the ambient space representing the Fulton-MacPherson intersection product of two schemes inside a variety
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isComponentContained -- Tests containment of (irreducible) varieties
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isComponentContained(Ideal,Ideal) -- Tests containment of (irreducible) varieties
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isMultiHom -- Tests if an ideal is multi-homogeneous with respect to the grading of its ring
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isMultiHom(Ideal) -- Tests if an ideal is multi-homogeneous with respect to the grading of its ring
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makeChowRing -- Makes the Chow ring of a product of projective spaces.
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makeChowRing(Ring) -- Makes the Chow ring of a product of projective spaces.
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makeChowRing(Ring,Symbol) -- Makes the Chow ring of a product of projective spaces.
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makeProductRing -- Makes the coordinate ring of a product of projective spaces.
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makeProductRing(List) -- Makes the coordinate ring of a product of projective spaces.
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makeProductRing(Ring,List) -- Makes the coordinate ring of a product of projective spaces.
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multiplicity -- This method computes the algebraic (Hilbert-Samuel) multiplicity
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multiplicity(Ideal,Ideal) -- This method computes the algebraic (Hilbert-Samuel) multiplicity
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projectiveDegree -- This method computes a single projective degree of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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projectiveDegree(Ideal,Ideal,RingElement) -- This method computes a single projective degree of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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projectiveDegrees -- This method computes the projective degrees of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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projectiveDegrees(Ideal,Ideal) -- This method computes the projective degrees of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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projectiveDegrees(Ideal,Ideal,QuotientRing) -- This method computes the projective degrees of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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segre -- This method computes the Segre class of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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segre(Ideal,Ideal) -- This method computes the Segre class of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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segre(Ideal,Ideal,QuotientRing) -- This method computes the Segre class of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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SegreClasses -- Tests containment of varieties and computes algebraic multiplicity of subvarieties and Fulton-MacPherson intersection products - via a very general Segre class computation
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segreDimX -- This method computes the dimension X part of the Segre class of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces
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segreDimX(Ideal,Ideal,QuotientRing) -- This method computes the dimension X part of the Segre class of a scheme X inside a scheme Y, where X,Y are subschemes of some product of projective spaces