Holography of geodesic flows, harmonizing metrics, and billiards' dynamics

Abstract

Let (M, g) be a Riemannian manifold with boundary, where g is a non-trapping metric. Let SM be the space of the spherical tangent to M bundle, and vg the geodesic vector field on SM. We study the scattering maps Cvg: ∂+1SM ∂-1SM, generated by the vg-flow, and the dynamics of the billiard maps Bvg, τ: ∂+1SM ∂+1SM, where τ denotes an involution, mimicking the elastic reflection from the the boundary ∂ M. We getting a variety of holography theorems that tackle the inverse scattering problems for Cvg and theorems that describe the dynamics of Bvg, τ. Our main tools are a Lyapunov function F: SM R for vg and a special harmonizing Riemannian metrics g on SM, a metric in which dF is harmonic. For such metrics g, we get a family of isoperimetric inequalities of the type volg(SM) ≤ volg |(∂(SM)) and formulas for the average volume of the minimal hypesufaces \F-1(c)\c ∈ F(SM). We investigate the interplay between the harmonizing metrics g and the classical Sasaki metric gg on SM. Assuming ergodicity of Bvg, τ, we also get Santal\'o-Chernov type formulas for the average length of free geodesic segments in M and for the average variation of the Lyapunov function F along the vg-trajectories.