Scalar curvature rigidity for products of spheres and tori

Abstract

We prove Llarull-type rigidity for Sn-m×Tm (3 n 7, 1 m n-2). If a closed spin (Mn,g) admits a degree-nonzero map to Sn-m×Tm whose spherical projection is area non-increasing, and there exists ∈ C∞(M) with -M-12|DM|2+12(RM-(n-m)(n-m-1))0, then (M,g) is isometrically covered by Sn-m×Rm. For bands, we extend Gromov's torical inequality and obtain sharp width bounds: dist(∂-M,∂+M) 2πn/((n+1)σ) when RM (n-m)(n-m-1)+σ. The method combines stable weighted slicing with a spectral Dirac operator argument.

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