学术报告(曹亚龙 6.10)

全纯辛4维流形的Gopakumar-Vafa型不变量

发布人:肖怡霏 发布日期:2022-06-02
主题
全纯辛4维流形的Gopakumar-Vafa型不变量
活动时间
-
活动地址
必赢唯一官方网站 112教室
主讲人
曹亚龙 研究员 日本Riken理化学研究所
主持人
李长征

Gromov-Witten invariants of holomorphic symplectic 4-folds vanish and one can consider the corresponding reduced theory. In this talk, we will explain a definition of Gopakumar-Vafa type invariants for such a reduced theory. These invariants are conjectured to be integers and have alternative interpretations using sheaf theoretic moduli spaces. Our conjecture is proved for the product of two K3 surfaces, which naturally leads to a closed formula of Fujiki constants of Chern classes of tangent bundles of Hilbert schemes of points on K3 surfaces. On a very general holomorphic symplectic 4-folds of K3^[2] type, our conjecture provides a Yau-Zaslow type formula for the number of isolated genus 2 curves of minimal degree. Based on joint works with Georg Oberdieck and Yukinobu Toda.