# Resonances for obstacles in hyperbolic space

**Authors:** Peter Hintz, Maciej Zworski

arXiv: 1703.01384 · 2020-05-28

## TL;DR

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## Contribution

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## Abstract

We consider scattering by star-shaped obstacles in hyperbolic space and show that resonances satisfy a universal bound $\mathrm{Im}\,\lambda \leq -\frac{1}{2}$ which is optimal in dimension $2$. In odd dimensions we also show that $\mathrm{Im}\,\lambda \leq -\frac{\mu}{\rho}$ for a universal constant $\mu$, where $\rho$ is the radius of a ball containing the obstacle; this gives an improvement for small obstacles. In dimensions $3$ and higher the proofs follow the classical vector field approach of Morawetz, while in dimension $2$ we obtain our bound by working with spaces coming from general relativity. We also show that in odd dimensions resonances of small obstacles are close, in a suitable sense, to Euclidean resonances.

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## References

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Source: https://tomesphere.com/paper/1703.01384