报告人:戎小春(罗格斯大学)
时间:2026年6月12日14:30-15:30
地点:物质科研楼C1124
Let X be a compact Gromov-Hausdorff limit space of a collapsing sequence of compact asphercial n-manifolds, Mi, of Ricci curvature RicMi ≥ −(n−1) and any point in the Riemannian universal covering space of Mi is a Reifenberg point, or sectional curvature secMi ≥ −1, respectively. We conjecture that if the fundamental group of Mi satisfies a certain condition, then X is diffeomorphic, or homeomorphic to an aspherical manifold, respectively. In this talk, we will report recent advances on this conjecture.
