29.10.2025, 11:00
– Campus Golm, Building 9, Room 2.22 and via Zoom
Arbeitsgruppenseminar Analysis
Strong generalized holomorphic principal bundle
Debjit Pal (Leibniz Universität Hannover)
Thomas Tony
Llarull proved in the late '90s that the round n-sphere is area-extremal, meaning that one cannot simultaneously increase both its scalar curvature and its metric. Goette and Semmelmann generalized Llarull's rigidity statement to certain area-non-increasing spin maps \(f: M\to N\) of non-zero \(\hat{A}\)-degree.
In this talk, I give a brief introduction to scalar curvature comparison geometry and explain how higher index theory can be used in this context. More specifically, I present a recent generalization of Goette and Semmelmann’s theorem, in which the topological condition on the \(\hat{A}\)-degree is replaced by a weaker condition involving the so-called higher mapping degree. A key challenge in the proof is that a non-vanishing higher index does not necessarily give rise to a non-trivial kernel of the corresponding Dirac operator. I will present a new method that extracts geometrically useful information even in this more general setting.