The membership problem for polynomial ideals in terms of residue currents

Mats Andersson

Displaying similar documents to “The membership problem for polynomial ideals in terms of residue currents”

On the Briançon-Skoda theorem on a singular variety

Mats Andersson, Håkan Samuelsson, Jacob Sznajdman (2010)

Annales de l’institut Fourier

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Let $Z$ be a germ of a reduced analytic space of pure dimension. We provide an analytic proof of the uniform Briançon-Skoda theorem for the local ring $𝒪_{Z}$ ; a result which was previously proved by Huneke by algebraic methods. For ideals with few generators we also get much sharper results.

On Bochner-Martinelli residue currents and their annihilator ideals

Mattias Jonsson, Elizabeth Wulcan (2009)

Annales de l’institut Fourier

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We study the residue current $R^{f}$ of Bochner-Martinelli type associated with a tuple $f = (f_{1}, \dots, f_{m})$ of holomorphic germs at $0 \in C^{n}$ , whose common zero set equals the origin. Our main results are a geometric description of $R^{f}$ in terms of the Rees valuations associated with the ideal $(f)$ generated by $f$ and a characterization of when the annihilator ideal of $R^{f}$ equals $(f)$ .

An explicit formula for period determinant

Alexey A. Glutsyuk (2006)

Annales de l’institut Fourier

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We consider a generic complex polynomial in two variables and a basis in the first homology group of a nonsingular level curve. We take an arbitrary tuple of homogeneous polynomial 1-forms of appropriate degrees so that their integrals over the basic cycles form a square matrix (of multivalued analytic functions of the level value). We give an explicit formula for the determinant of this matrix.

Optimal destabilizing vectors in some Gauge theoretical moduli problems

Laurent Bruasse (2006)

Annales de l’institut Fourier

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We prove that the well-known Harder-Narsimhan filtration theory for bundles over a complex curve and the theory of optimal destabilizing $1$ -parameter subgroups are the same thing when considered in the gauge theoretical framework. Indeed, the classical concepts of the GIT theory are still effective in this context and the Harder-Narasimhan filtration can be viewed as a limit object for the action of the gauge group, in the direction of an optimal destabilizing vector. This...

Geometry of currents, intersection theory and dynamics of horizontal-like maps

Tien-Cuong Dinh, Nessim Sibony (2006)

Annales de l’institut Fourier

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We introduce a geometry on the cone of positive closed currents of bidegree $(p, p)$ and apply it to define the intersection of such currents. We also construct and study the Green currents and the equilibrium measure for horizontal-like mappings. The Green currents satisfy some extremality properties. The equilibrium measure is invariant, mixing and has maximal entropy. It is equal to the intersection of the Green currents associated to the horizontal-like map and to its inverse.