Shapes of hyperbolic triangles and once-punctured torus groups

Abstract

Let be a hyperbolic triangle with a fixed area . We prove that for all but countably many , generic choices of have the property that the group generated by the π--rotations about the midpoints of the sides of the triangle admits no nontrivial relations. By contrast, we show for all ∈(0,π)π, a dense set of triangles does afford nontrivial relations, which in the generic case map to hyperbolic translations. To establish this fact, we study the deformation space Cθ of singular hyperbolic metrics on a torus with a single cone point of angle θ=2(π-), and answer an analogous question for the holonomy map of such a hyperbolic structure . In an appendix by X.~Gao, concrete examples of θ and ∈Cθ are given where the image of each is finitely presented, non-free and torsion-free; in fact, those images will be isomorphic to the fundamental groups of closed hyperbolic 3--manifolds.