A semidefinite program for least distortion embeddings of flat tori into Hilbert spaces

Abstract

We derive and analyze an infinite-dimensional semidefinite program which computes least distortion embeddings of flat tori Rn/L, where L is an n-dimensional lattice, into Hilbert spaces. This enables us to provide a constant factor improvement over the previously best lower bound on the minimal distortion of an embedding of an n-dimensional flat torus. As further applications we prove that every n-dimensional flat torus has a finite dimensional least distortion embedding, that the standard embedding of the standard tours is optimal, and we determine least distortion embeddings of all 2-dimensional flat tori.