报告人:韩骥原(西湖大学)
时间:2026年5月21日14:30-15:30
地点:上海研究院新园区1号楼A座1329&腾讯会议:942 663 0176,密码:202501
Weighted-cscK metrics provide a universal framework for the study of canonical metrics, e.g., extremal metrics, Kahler-Ricci soliton metrics, \mu-cscK metrics. In joint works with Yaxiong Liu, we prove that on a Kahler manifold X, the G-coercivity of weighted Mabuchi functional implies the existence of weighted-cscK metrics. In particular, there exists a weighted-cscK metric if X is a projective manifold that is weighted K-stable for models. We will also discuss some progress on singular varieties, e.g, the existence of weighted-cscK on a toric resolution.
For more information, please visit: https://vtmaths.github.io/imfp-igp-seminar/index.html
