Multiplicities of a bigraded ring and intersection theory

Achilles, Rüdiger; Manaresi, Mirella

doi:10.1007/s002080050128

Cited by 43 publications

(92 citation statements)

References 12 publications

Supporting

Mentioning

Contrasting

Unclassified

Order By: Relevance

“…Given a bigraded ring A and a bigraded A-module M , the "right" polynomial to be considered to define multiplicity is the sum transform of the Hilbert polynomial as shown in [3]. We recall here some results of [3].…”

Section: Multiplicities Of Bigraded Modulesmentioning

confidence: 99%

“…We recall here some results of [3]. Let h(i, j) = length A (0,0) (M (i,j) ) be the Hilbert function of M , and h (1,0) (i, j) = i u=0 h(u, j) the sum transform of h with respect to the first variable.…”

Section: Multiplicities Of Bigraded Modulesmentioning

confidence: 99%

“…Extending to the case of modules a definition of [3], the multiplicity of an arbitrary ideal I with respect to a finitely generated A-module M is defined to be the multiplicity of the bigraded module GG(M ).…”

Section: Generalized Arithmetic Multiplicity Of a Local Ringmentioning

confidence: 99%

“…So, if I = m we obtain the usual notion of arithmetic degree, see Vasconcelos [19], p. 223. We recall another result, which is straightforward from [3], Proposition 2.5, which we will use in the proof of the next theorem. …”

Section: Generalized Arithmetic Multiplicity Of a Local Ringmentioning

confidence: 99%

See 3 more Smart Citations

Arithmetic degree and associated graded modules

Vinai

2004

manuscripta math.

View full text Add to dashboard Cite

Abstract1 We prove that the arithmetic degree of a graded or local ring A is bounded above by the arithmetic degree of any of its associated graded rings with respect to ideals I in A. In particular, if Spec(A) is equidimensional and has an embedded component (i.e., A has an embedded associated prime ideal), then the normal cone of Spec(A) along V(I) has an embedded component too. This extends a result of W. M. Ruppert about embedded components of the tangent cone.

show abstract

Section: Multiplicities Of Bigraded Modulesmentioning

confidence: 99%

Section: Multiplicities Of Bigraded Modulesmentioning

confidence: 99%

Section: Generalized Arithmetic Multiplicity Of a Local Ringmentioning

confidence: 99%

Section: Generalized Arithmetic Multiplicity Of a Local Ringmentioning

confidence: 99%

See 2 more Smart Citations

Arithmetic degree and associated graded modules

Vinai

2004

manuscripta math.

View full text Add to dashboard Cite

show abstract

“…For a point x ∈ X, denote by g(x) := e x (C X (X × X)) the multiplicity of C X (X × X) at x. In [4] we proved that g(x) is the degree at x of the Stückrad-Vogel cycle v(X, X) = C j(X, X; C) [C] of the self-intersection of X, that is, g(x) = C j(X, X; C)e x (C) (see Proposition 3.6 for details). In this paper, our main result, Theorem 4.2, states that the pointwise degree g(x) of the Stückrad-Vogel intersection cycle of the self-intersection of X is a stratifying function which gives the canonical Whitney stratification.…”

Section: Introductionmentioning

confidence: 99%

Self-Intersections of Surfaces and Whitney Stratifications

Achilles

Manaresi²

2003

Proceedings of the Edinburgh Mathematical Society

View full text Add to dashboard Cite

Let X be a surface in C n or P n and let C X (X × X) be the normal cone to X in X × X (diagonally embedded). For a point x ∈ X, denote by g( is a former result of the authors that g(x) is the degree at x of the Stückrad-Vogel cycle v(X, X) = C j(X, X; C)[C] of the self-intersection of X, that is, g(x) = C j(X, X; C)ex(C).We prove that the stratification of X by the multiplicity g(x) is a Whitney stratification, the canonical one if n = 3. The corresponding result for hypersurfaces in A n or P n , diagonally embedded in a multiple product with itself, was conjectured by van Gastel. This is also discussed, but remains open.

show abstract