English

Analytic residue theory in the non-complete intersection case

Complex Variables 2007-05-23 v1 Algebraic Geometry

Abstract

In previous work of the authors and their collaborators (see Progress in Math, vol. 114, Birk\"auser, 1993) it was shown how the equivalence of several constructions of residue currents associated to complete intersection families of (germs of) holomorphic functions in Cn{\bf C}^n could be profitably used to solve algebraic problems like effective versions of the Nullstellensatz. In this work we explain how an application of similar ideas in the non-complete intersection case leads to a remarkable algebraic result, namely: Let P1,...,PnP_1,...,P_n be nn polynomials in nn variables such that the zero set of P1,...,PnP_1,...,P_n can be defined as the zero set of P1,...,PνP_1,...,P_\nu, with ν<n\nu < n. Then, the Jacobian J(P1,...,Pn)J(P_1,...,P_n) of (P1,...,Pn)(P_1,...,P_n) is in the ideal generated by the PjP_j, j=1,...,nj=1,...,n. The same methods lead to further insights into the construction of Green currents associated to effective cycles in projective space.

Keywords

Cite

@article{arxiv.math/9905051,
  title  = {Analytic residue theory in the non-complete intersection case},
  author = {C. A. Berenstein and A. Yger},
  journal= {arXiv preprint arXiv:math/9905051},
  year   = {2007}
}

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32 pages