We give a lower bound for the bottom of the $L^2$ differential form spectrum
on hyperbolic manifolds, generalizing thus a well-known result due to Sullivan
and Corlette in the function case. Our method is based on the study of the
resolvent associated with the Hodge-de Rham Laplacian and leads to applications
for the (co)homology and topology of certain classes of hyperbolic manifolds

Carron, Gilles

Pedon, Emmanuel

English

arXiv

Numérisation de Documents Anciens Mathématiques

On the differential form spectrum of hyperbolic manifolds

We give a lower bound for the bottom of the $L^2$ differential form spectrum on hyperbolic manifolds, generalizing thus a well-known result due to Sullivan and Corlette in the function case. Our method is based on the study of the resolvent associated with the Hodge-de~Rham Laplacian and leads to applications for the (co)homology and topology of certain classes of hyperbolic manifolds

HAL Descartes

HAL-Univ-Nantes

http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.235.280

On the differential form spectrum of hyperbolic manifolds

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Numérisation de Documents Anciens Mathématiques

HAL Descartes

HAL-Univ-Nantes