Workshop
A family of triply periodic polyhedral surfaces
- Dami Lee (Oklahoma State University)
Abstract
Inspired by the rich theory of triply periodic minimal surfaces, we study a family of triply periodic polyhedral surfaces that have several conformal representations. When quotiented by the translation lattice, we get a compact Riemann surface. Some of these examples answer questions in minimal surface theory, Teichmüller dynamics, and physics.
