On minimal kernels and Levi currents on weakly complete complex manifolds
Abstract
A complex manifold is \emph{weakly complete} if it admits a continuous plurisubharmonic exhaustion function . The minimal kernels (the loci where are all plurisubharmonic exhaustion functions fail to be strictly plurisubharmonic),introduced by Slodkowski-Tomassini, and the Levi currents, introduced by Sibony, are both concepts aimed at measuring how far is from being Stein. We compare these notions, prove that all Levi currents are supported by all the 's, and give sufficient conditions for points in to be in the support of some Levi current. When is a surface and can be chosen analytic, building on previous work by the second author, Slodkowski, and Tomassini,we prove the existence of a Levi current precisely supported on , and give a classification of Levi currents on . In particular,unless is a modification of a Stein space, every point in is in the support of some Levi current.
Cite
@article{arxiv.2102.05328,
title = {On minimal kernels and Levi currents on weakly complete complex manifolds},
author = {Fabrizio Bianchi and Samuele Mongodi},
journal= {arXiv preprint arXiv:2102.05328},
year = {2021}
}