Geodesic loops on tetrahedra in spaces of constant sectional curvature

Abstract

Geodesic loops on polyhedra were studied only for Euclidean space and it was known that there are no simple geodesic loops on regular tetrahedra. Here we prove that: 1) On the spherical space, there are no simple geodesic loops on tetrahedra with internal angles π/3 < αi<π/2 or regular tetrahedra with αi=π/2, and there are three simple geodesic loops for each vertex of a tetrahedra with αi > π/2 and the lengths of the edges alphai>π/2. 2) On the hyperbolic space, for every regular tetrahedron T and every pair of coprime numbers (p,q), there is one simple geodesic loop of (p,q) type through every vertex of T.