On the equivalence between local and global existence of complete Kähler metrics with plurisubharmonic potentials
arXiv:1505.06451
Abstract
Like the classical potential theory, it was conjectured that there exists equivalence between locally and globally pluripolar and complete pluripolar sets, namely, Problem I of Lelong, and was solved by Josefson, Bedford - Taylor and Colţoiu. In this article, we consider complements of complete Kähler domains as the generalization of closed complete pluripolar sets and prove that there exists an equivalence between local and global existence of these sets.
7 pages