Date/heure
15 septembre 2014
14:00 - 15:00
Oratrice ou orateur
Behrouz Taji
Catégorie d'évènement Séminaire de géométrie complexe
Résumé
A classical uniformization result of Yau shows that any compact Kähler manifold with vanishing
Chern classes is, up to a cover, an Abelian variety. After generalizing this result to the context
of Kawamata log-terminal (or klt, for short) varieties, we prove a complete characterization of quotients
of Abelian varieties (by finite groups acting freely in codimension-one) via vanishing of (orbifold) Chern classes.
The main ingredient of the proof consists of tracing a correspondence (up to a suitable cover) between
semistable reflexive sheaves over klt spaces with vanishing orbifold Chern classes and locally-free sheaves whose
associated bundle is flat.
This is a joint work with Steven Lu.