In mathematics, hyperbolic space is a type of non-Euclidean geometry.

The term "horn" is due to pseudosphere models of hyperbolic space.

Math professors have been teaching about hyperbolic space for decades, but did not think it was possible to create an exact physical model.

It is a non-Euclidean geometry looking at hyperbolic space.

The densest packings in any hyperbolic space are almost always irregular.

In hyperbolic space, the dihedral angle of a polyhedron depends on its size.

This group is said to characterize the hyperbolic space.

To beings living in a hyperbolic space it might be a suitable way of making a map.

Another model of hyperbolic space is also built on the open unit disk: the Klein model.

Polytopes were also studied in non-Euclidean spaces such as hyperbolic space.