English

Coleff-Herrera currents, duality, and Noetherian operators

Complex Variables 2011-08-24 v2

Abstract

Let \I\I be a coherent subsheaf of a locally free sheaf \Ok(E0)\Ok(E_0) and suppose that \F=\Ok(E0)/\I\F=\Ok(E_0)/\I has pure codimension. Starting with a residue current RR obtained from a locally free resolution of \F\F we construct a vector-valued Coleff-Herrera current μ\mu with support on the variety associated to \F\F such that ϕ\phi is in \I\I if and only if μϕ=0\mu\phi=0. Such a current μ\mu can also be derived algebraically from a fundamental theorem of Roos about the bidualizing functor, and the relation between these two approaches is discussed. By a construction due to Bj\"ork one gets Noetherian operators for \I\I from the current μ\mu. The current RR also provides an explicit realization of the Dickenstein-Sessa decomposition and other related canonical isomorphisms.

Cite

@article{arxiv.0902.3064,
  title  = {Coleff-Herrera currents, duality, and Noetherian operators},
  author = {Mats Andersson},
  journal= {arXiv preprint arXiv:0902.3064},
  year   = {2011}
}
R2 v1 2026-06-21T12:12:48.289Z