English

Higher dimensional Zariski decompositions

Algebraic Geometry 2016-09-07 v1

Abstract

Using currents with minimal singularities, we construct pointwise minimal multiplicities for a real pseudo-effective (1,1)(1,1)-class α\alpha on a compact complex nn-fold XX, which are the local obstructions to the numerical effectivity of α\alpha. The negative part of α\alpha is then defined as the real effective divisor N(α)N(\alpha) whose multiplicity along a prime divisor DD is just the generic multiplicity of α\alpha along DD, and we get in that way a divisorial Zariski decomposition of α\alpha into the sum of a class Z(α)Z(\alpha) which is nef in codimension 1 and the class of its negative part N(α)N(\alpha), which is exceptional in the sense that it is very rigidly embedded in XX. The positive parts Z(α)Z(\alpha) generate a modified nef cone, and the pseudo-effective cone is shown to be locally polyhedral away from the modified nef cone, with extremal rays generated by exceptional divisors. We then treat the case of a surface and a hyper-K\"ahler manifold in some detail: under the intersection form (resp. the Beauville-Bogomolov form), we characterize the modified nef cone and the exceptional divisors; our divisorial Zariski decomposition is orthogonal, and is thus a rational decomposition, which fact accounts for the usual existence statement of a Zariski decomposition on a projective surface, which is thus extended to the hyper-K\"ahler case. Finally, we explain how the divisorial Zariski decomposition of (the first Chern class of) a big line bundle on a projective manifold can be characterized in terms of the asymptotics of the linear series kL|kL| as kk\to\infty.

Keywords

Cite

@article{arxiv.math/0204336,
  title  = {Higher dimensional Zariski decompositions},
  author = {Sebastien Boucksom},
  journal= {arXiv preprint arXiv:math/0204336},
  year   = {2016}
}