From discrete to dense: explorations in the moduli space of triangles

Abstract

The moduli space of triangles is a two-dimensional space that records triangle shapes in the plane, considered up to similarity. We study the subset corresponding to lattice triangles, which are triangles whose vertices have integer coordinates. We prove that this subset is dense, that is, every triangle shape can be approximated arbitrarily well by lattice triangles. However, when one restricts to lattice triangles in the square [-N,N]2, their shapes do not become uniformly distributed in the moduli space as N grows. Along the way, we encounter connections with geometry, number theory, analysis, and probability.