Intrinsic pseudo-volume forms for logarithmic pairs
Abstract
We study an adaptation to the logarithmic case of the Kobayashi-Eisenman pseudo-volume form, or rather an adaptation of its variant defined by Claire Voisin, for which she replaces holomorphic maps by holomorphic K-correspondences. We define an intrinsic logarithmic pseudo-volume form \Phi_{X,D} for every pair (X,D) consisting of a complex manifold X and a normal crossing Weil divisor, the positive part of which is reduced. We then prove that \Phi_{X,D} is generically non-degenerate when X is projective and K_X+D is ample. This result is analogous to the classical Kobayashi-Ochiai theorem. We also show the vanishing of \Phi_{X,D} for a large class of log-K-trivial pairs, which is an important step in the direction of the Kobayashi conjecture about infinitesimal measure hyperbolicity in the logarithmic case.
Cite
@article{arxiv.0804.4811,
title = {Intrinsic pseudo-volume forms for logarithmic pairs},
author = {Thomas Dedieu},
journal= {arXiv preprint arXiv:0804.4811},
year = {2011}
}
Comments
Some typos corrected, e.g. in the statements of thm 1 and cor 2.11