Qiaochu Ma, Jinmin Wang, Guoliang Yu, Bo Zhu
Published 2024-10-11Version 1
In this paper, we prove an upper bound on the $\widehat{A}$ genus of a smooth, closed, spin Riemannian manifold using its scalar curvature lower bound, Neumann isoperimetric constant, and volume. The proof of this result relies on spectral analysis of the Dirac operator. We also construct an example to show that the Neumann isoperimetric constant in this bound is necessary. Our result partially answers a question of Gromov on bounding characteristic numbers using scalar curvature lower bound.
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Geometry of three-dimensional manifolds with scalar curvature lower bound
Scalar curvature lower bound under integral convergence
Rigidity and non-rigidity of $\H^n/\Z^{n-2}$ with scalar curvature bounded from below
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