Infinite \3,7\-surface in H3

Abstract

Objects with large symmetry groups have been an interest for many mathematicians. A classical question in geometry is whether a surface with certain geometric features, such as completeness, curvature, etc..., can embed in R3. In a recent paper, Lee constructs an infinite \3,7\-surface in R3 by gluing together prisms and antiprisms, in an attempt to find a periodic surface in R3 that is cover of Klein's quartic. While Lee's construction shows that such construction self-intersects in R3, it does not prove nor disprove the possibility of an embedding. In this paper, we explore a possible embedding of the genus three Klein's quartic, or its cover, in hyperbolic space.