The classification of finite group actions on complex K3 surfaces (joint work with Tommy Hofmann) (Simon Brandhorst)

Séminaire « Géométrie algébrique »
Kampé de Fériet (M2)
Named by André Weil after the mathematicians Kodaira, Kummer and Kähler and the mountain K2, K3 surfaces are one of the prominent classes of compact complex surfaces - they are the two dimensional Calabi-Yau manifolds. In this talk we classify all finite group actions on K3 surfaces up to deformation.

Tweeter Facebook