A generalized Poincaré-Lelong formula

Mats Andersson

doi:10.7146/math.scand.a-15040

Authors

Mats Andersson

DOI:

https://doi.org/10.7146/math.scand.a-15040

Abstract

We prove a generalization of the classical Poincaré-Lelong formula. Given a holomorphic section

$f$ , with zero set

$Z$ , of a Hermitian vector bundle

$E\to X$ , let

$S$ be the line bundle over

$X\setminus Z$ spanned by

$f$ and let

$Q=E/S$ . Then the Chern form

$c(D_Q)$ is locally integrable and closed in

$X$ and there is a current

$W$ such that

${dd}^cW=c(D_E)-c(D_Q)-M,$ where

$M$ is a current with support on

$Z$ . In particular, the top Bott-Chern class is represented by a current with support on

$Z$ . We discuss positivity of these currents, and we also reveal a close relation with principal value and residue currents of Cauchy-Fantappiè-Leray type.

A generalized Poincaré-Lelong formula

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