Residue currents of cohesive modules and the generalized Poincar\'e-Lelong formula on complex manifolds
Abstract
Cohesive module provides a tool to study coherent sheaves on complex manifolds by global analytic methods. In this paper we develop the theory of residue currents for cohesive modules on complex manifolds. In particular we prove that they have the duality principle and satisfy the comparison formula. As an application, we prove a generalized version of the Poincar\'e-Lelong formula for cohesive modules, which applies to coherent sheaves without globally defined locally free resolutions.
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