Add to ORKGIn this contribution I provide new examples of integrable billiard systems in hyperbolic geometry. In particular, I present one billiard system in the hyperbolic plane, called ''Circular billiard in the Poincare disc'', and one three-dimensional billiard, called ''Spherical billiard in the Poincare ball''. In each of the billiard systems, the quantization condition leads to transcendental equations for the energy eigen-values E_n, which must be solved numerically. The energy eigen-values are statistically analysed with respect to spectral rigidity and the normalized fluctuations about Weyl's law. For comparison, some flat two- and three-dimensional billiard systems are also mentioned. The found results are in accordance with the semiclassic...