UNIFORM ESTIMATES OF THE RESOLVENT OF THE LAPLACE –BELTRAMI OPERATOR ON INFINITE VOLUME RIEMANNIAN MANIFOLDS WITH CUSPS
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Publication:3149936
DOI10.1081/PDE-120005844zbMath1015.58005MaRDI QIDQ3149936
Publication date: 15 July 2003
Published in: Communications in Partial Differential Equations (Search for Journal in Brave)
Related Items
Local energy decay of solutions to the wave equation for nontrapping metrics ⋮ Extending Cutoff Resolvent Estimates via Propagation of Singularities ⋮ Applications of resonance theory without analyticity assumption
Cites Work
- Stabilization of the wave equation by the boundary
- A Mourre estimate and related bounds for hyperbolic manifolds with cusps of non-maximal rank
- Spectral analysis of second-order elliptic operators on noncompact manifolds
- Scattering asymptotics for Riemann surfaces
- Local energy decay of the wave equation in an exterior problem and without resonance in the neighborhood of the real line
- Exponential bounds of the resolvent for a class of noncompactly supported perturbations of the Laplacian
- Upper bounds on the number of resonances for non-compact Riemann surfaces
- Contróle Exact De Léquation De La Chaleur
