Rigidity and L² cohomology of hyperbolic manifolds
classification
🧮 math.DG
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cohomologyhyperbolicresultsrigiditysomespacesalreadybackslash
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When $X=\Gamma\backslash \H^n$ is a real hyperbolic manifold, it is already known that if the critical exponent is small enough then some cohomology spaces and some spaces of $L^2$ harmonic forms vanish. In this paper, we show rigidity results in the borderline case of these vanishing results.
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