Rigidity of Riemannian embeddings of discrete metric spaces

Abstract

Let M be a complete, connected Riemannian surface and suppose that S ⊂ M is a discrete subset. What can we learn about M from the knowledge of all distances in the surface between pairs of points of S? We prove that if the distances in S correspond to the distances in a 2-dimensional lattice, or more generally in an arbitrary net in R2, then M is isometric to the Euclidean plane. We thus find that Riemannian embeddings of certain discrete metric spaces are rather rigid. A corollary is that a subset of Z3 that strictly contains Z2 × \ 0 \ cannot be isometrically embedded in any complete Riemannian surface.