Sébastien Boucksom, Salvatore Cacciola, Angelo Felice Lopez
Published 2013-05-18, updated 2014-02-28Version 2
We extend to normal projective varieties defined over an arbitrary algebraically closed field a result of Ein, Lazarsfeld, Musta\c{t}\u{a}, Nakamaye and Popa characterizing the augmented base locus (aka non-ample locus) of a line bundle on a smooth projective complex variety as the union of subvarieties on which the restricted volume vanishes. We also give a proof of the folklore fact that the complement of the augmented base locus is the largest open subset on which the Kodaira map defined by large and divisible multiples of the line bundle is an isomorphism.
Comments: 7 pages. v2: we made a small modification of the statement of Lemma 2.4, a few minor corrections and updated references
The stable and augmented base locus under finite morphisms
Restricted volumes and base loci of linear series
Deformation of line bundles on coisotropic subvarieties
![QR code for arXiv:1305.4284 [math.AG]](http://oss.arxitics.com/images/favicon.svg)