Translation Surfaces arising from Right Regular Prisms

Abstract

We study flat metrics arising from right regular n-prisms by viewing them as n-differentials and analyzing their associated unfoldings. We show that the unfolding of a right regular n-prism is never a lattice surface unless n=4, in contrast with the case of Platonic solids. Despite this, we prove that these surfaces admit translation coverings to hyperelliptic surfaces, allowing us to determine their GL(2,R)-orbit closures using the classification of hyperelliptic components of strata. As a consequence, we obtain exact quadratic asymptotics for a certain average of the number of saddle connections on the base surfaces, their unfoldings, and the original prisms, including their Siegel--Veech constants. This provides a natural infinite family of non-lattice surfaces for which orbit closures and counting problems can be computed explicitly.