Residue currents of holomorphic morphisms
Abstract
Given a generically surjective holomorphic vector bundle morphism , and Hermitian bundles, we construct a current with values in , where is a certain derived bundle, and with support on the set where is not surjective. The main property is that if is a holomorphic section of , and , then locally has a holomorphic solution . In the generic case also the converse holds. This gives a generalization of the corresponding theorem for a complete intersection, due to Dickenstein-Sessa and Passare. We also present results for polynomial mappings, related to M Noether's theorem and the effective Nullstellensatz. The construction of the current is based on a generalization of the Koszul complex. By means of this complex one can also obtain new global estimates of solutions to , and as an example we give new results related to the -corona problem.
Cite
@article{arxiv.math/0511241,
title = {Residue currents of holomorphic morphisms},
author = {Mats Andersson},
journal= {arXiv preprint arXiv:math/0511241},
year = {2007}
}