Topological rigidity of the first Betti number

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Shaosai Huang, University of California, Berkeley

Online Talk

Zoom linkhttps://princeton.zoom.us/j/99576580357

The infranil fiber bundle is a typical structure appearing in the collapsing geometry with bounded sectional curvature. In this talk, I will discuss a topological condition on the first Betti numbers that guarantees a torus fiber bundle structure (a special type of infranil fiber bundle) for collapsing manifolds with only Ricci curvature bounded below. A major technique applied here is smoothing by Ricci flows.

This is a joint work with Bing Wang.