Finite quotients of abelian varieties, étale in codimension 2, with a Calabi-Yau resolution

Date/heure
10 octobre 2022
14:00 - 15:00

Lieu
Salle de conférences Nancy

Oratrice ou orateur
Cécile Gachet

Catégorie d'évènement
Séminaire de géométrie complexe


Résumé

Let A be an abelian variety and G be a finite group acting on
A. If G acts freely in codimension 1, then the quotient A/G has
numerically trivial canonical divisor. A natural question is then
whether A/G admits a crepant resolution: under the additional assumption
that G acts freely in codimension 2, such a crepant resolution X would
be remarkable Calabi-Yau manifold (as it would have a nef and big
divisor D such that c_2(X)\cdot D^{n-2} = 0). Classifying such
quotients, étale in codimension 2, that admit a simply-connected crepant
resolution, was implemented by Oguiso in dimension 3 in the 90ies. We
extend his results to dimension 4 and 5, and give partial results in
arbitrary dimension.