Date/heure
16 mars 2026
15:30 - 16:30
Lieu
Salle de conférences Nancy
Oratrice ou orateur
Ekaterina Amerik
Catégorie d'évènement Séminaire de géométrie complexe
Résumé
It is known since Wierzba–Wisniewski’s work in 2003 that a birational map between holomorphic symplectic fourfolds is a composition of Mukai flops. Hu and Yau conjectured that in any dimension, a birational map is a composition of Mukai elementary transformations in codimension two, that is, maps which locally look like a product of a 4-dimensional Mukai flop and the identity on a polydisc, « up to codimension three or higher ». Call a birational map f from X to X’ a « Hu-Yau transformation » , if there are proper closed subsets Z, Z’ of codimension three or higher such that f induces a Mukai transformation in codimension two between X\Z and X’\Z’. We show that any birational map between irreducible holomorphic symplectic manifolds is a product of Hu-Yau transformations, and give an example showing that a stronger version of the conjecture cannot be true: it is in general not possible to decompose a given map into a product of Mukai elementary transformation after discarding some codimension three closed subsets from the source and the target.