报告人:张世宇(中国科学技术大学)
时间:2025年10月23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,会议密码:202501
Recently, we proved that a compact Kähler manifold has rational dimension at least n-k+1 if its tangent bundle is BC-p positive for every p≥k. This curvature positivity, introduced by L. Ni, can be guaranteed by various differential-geometric curvature positivity of the tangent bundle, such as positive holomorphic sectional curvature, mean curvature positivity, uniformly RC-positivity and etc. We demonstrate that this positivity naturally arises in a Bochner-type formula associated with the MRC fibration. As a new application in a broader context, we answer a question posed by F. Zheng, Q. Wang, and L. Ni, namely, that any compact Kähler manifold with positive orthogonal Ricci curvature must be rationally connected. Additionally, I will introduce our earlier work, which generalizes Yau's conjecture on positive holomorphic sectional curvature to the quasi-positive case via a Bochner-type integral inequality. These works are joint with Xi Zhang.
For more information, please visit: https://vtmaths.github.io/imfp-igp-seminar/index.html
