On the Kobayashi-Hitchin correspondence for K\"ahler currents
Abstract
In this paper, we show that if a holomorphic vector bundle is slope polystable with respect to a K\"ahler class, then it admits a Hermitian-Yang-Mills metric with respect to a suitable K\"ahler current with singularities in higher codimension which represents the K\"ahler class. Most parts of the proof remains valid for closed positive (1,1)-currents representing a nef and big class.
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