学术报告
Quantitative nilpotent structure and $epsilon$-regularity on collapsed manifolds with Ricci curvature bounds
题目: Quantitative nilpotent structure and $epsilon$-regularity on collapsed manifolds with Ricci curvature bounds
报告人:张若冰 博士(美国普林斯顿大学)
摘要: In this talk we discuss the $/epsilon$-regularity theorems for Einstein manifolds and more generally manifolds with just bounded Ricci curvature, in the collapsed setting. A key tool in the regularity theory of noncollapsed Einstein manifolds is the following: If a bigger geodesic ball on an Einstein manifold is sufficiently Gromov-Hausdorff-close to a ball on the Euclidean space of the same dimension, then in fact the curvature on a smaller ball is uniformly bounded. No such results are known in the collapsed setting, and in fact it is easy to see without more such results are false. It turns out that the failure of such an estimate is related to topology. Our main theorem is that for the above setting in the collapsed context, either the curvature is bounded, or the local nilpotent rank drops. There are generalizations of this result to bounded Ricci curvature and even just lower Ricci curvature. This is a joint work with Aaron Naber.
时间:6月26日(周五)下午15:00-16:00
地点:首都师大北二区教学楼 517 教室
欢迎全体师生积极参加!
