Scalar curvature rigidity of parabolically convex domains in hyperbolic spaces

Abstract

For a parabolically convex domain M⊂eq Hn, n 3, we prove that if f:(N, g) (M,g) has nonzero degree, where N is spin with scalar curvature RN -n(n-1), and if f|∂ N does not increase the distance and the mean curvature, then N is hyperbolic, and ∂ N is isometric to ∂ M. This is a partial generalization of Lott's result lott2021index to negative lower bounds of scalar curvature.

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