Date/heure
23 mars 2026
14:00 - 15:00
Oratrice ou orateur
Jonathan Glöckle
Catégorie d'évènement Séminaire de géométrie différentielle
Résumé
A couple of years ago, Ammann, Kröncke and Müller proposed a construction producing initial data sets for spacetimes with lightlike parallel spinor as studied by Baum, Leistner and Lischewski in the context of Lorentzian special holonomy. The input data for the AKM-construction essentially consists of a curve in the moduli space of Ricci-flat metrics on a closed manifold Q together with a parallel spinor for a metric representing its starting point. It remained unclear, however, to which extent all initial data for spacetimes with lightlike parallel spinor can be obtained by this construction for a fixed codimension 2 topology Q. In this talk, based on joint work with Bernd Ammann and Klaus Kröncke, we seek to improve the construction. It turns out that there is mainly only one additional freedom: to prescribe a single geometrically meaningful scalar function.