Seeing Through Hyperbolic Space: Visibility for λ-Geodesic Hyperplanes

Abstract

We study visibility from a fixed point in the presence of a Poisson process of λ--geodesic hyperplanes in a d-dimensional hyperbolic space. The family of λ--geodesic hyperplanes interpolates between totally geodesic hyperplanes and horospheres. Our main result establishes a universality principle for this model: we prove that the fundamental visibility properties are invariant with respect to the parameter λ∈[0,1]. Namely, there is a critical intensity γcrit>0 such that the visible region is unbounded with positive probability for γ < γcrit and almost surely bounded for γ > γcrit. For d=2 we establish almost sure boundedness also at criticality. The value for γcrit is explicit and does not depend on λ. In the bounded phase, we show that the mean visible volume is identical with the known formula for λ=0. The key integral-geometric step is an explicit computation showing that the measure of λ-geodesic hyperplanes hitting a geodesic segment is a linear function of the length of the segment, independent of~λ.