Spectral rigidity of manifolds with Ricci bounded below and maximal bottom spectrum
Abstract
We investigate the spectrum of the Laplacian on complete, non-compact manifolds Mn whose Ricci curvature satisfies Ric ≥ -(n-1)H(r), for some continuous, non-increasing H with H-1 ∈ L1(∞). We prove that if the bottom spectrum attains the maximal value (n-1)24 compatible with the curvature bound, then the spectrum of M coincides with that of hyperbolic space Hn, namely, σ(M) = [ (n-1)24, ∞ ). The result can be localized to an end E with infinite volume.
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