Spectral Flow, Llarull's Rigidity Theorem in Odd Dimensions and its Generalization

Abstract

For a compact spin Riemannian manifold (M,gTM) of dimension n such that the associated scalar curvature kTM verifies that kTM≥slant n(n-1), Llarull's rigidity theorem says that any area-decreasing smooth map f from M to the unit sphere Sn of nonzero degree is an isometry. We present in this paper a new proof for Llarull's rigidity theorem in odd dimensions via a spectral flow argument. This approach also works for a generalization of Llarrull's theorem when the sphere Sn is replaced by an arbitrary smooth strictly convex closed hypersurface in Rn+1. The results answer two questions by Gromov.