From geodesic flow to wave dynamics on hyperbolic surfaces
摘要
We study the geodesic flow on the unit cotangent bundle of a closed hyperbolic surface , using the representation theory of . We construct explicit -adapted Hilbert spaces, obtained by completing propagated dense domains of , which are tailored to the spectral analysis of the geodesic generator . In these spaces, becomes a normal operator with discrete spectrum, except at the threshold , where Jordan blocks of size two may occur. In this Hilbert model, the propagator factorizes into a damped harmonic oscillator with eigenvalues , , and a transverse part involving the shifted wave group on , together with the holomorphic and anti-holomorphic discrete series. The model clarifies two classical links between geodesic dynamics and the Laplace spectrum. Comparing the spectral trace of the propagator in the -adapted Hilbert model with the Atiyah--Bott--Guillemin flat trace gives a dynamical form of the Selberg trace formula: closed geodesics arise from the flat trace, while the spectral side comes from the explicit -decomposition. The same factorization also explains the large-time structure of spherical mean operators on : after the natural -renormalization and the removal of a finite-rank low-energy part, the shifted wave equation on emerges as the leading effective dynamics. Thus the construction provides an explicit Hilbert-space structure relating classical geodesic dynamics, Ruelle resonances, and the spectral theory of the surface.
引用
@article{arxiv.2605.28243,
title = {From geodesic flow to wave dynamics on hyperbolic surfaces},
author = {Frédéric Faure},
journal= {arXiv preprint arXiv:2605.28243},
year = {2026}
}