Minimax Boundary Estimation and Estimation with Boundary

Abstract

We derive non-asymptotic minimax bounds for the Hausdorff estimation of d-dimensional submanifolds M ⊂ RD with (possibly) non-empty boundary ∂ M. The model reunites and extends the most prevalent C2-type set estimation models: manifolds without boundary, and full-dimensional domains. We consider both the estimation of the manifold M itself and that of its boundary ∂ M if non-empty. Given n samples, the minimax rates are of order O(( n/n)2/d) if ∂ M = and O(( n/n)2/(d+1)) if ∂ M ≠ , up to logarithmic factors. In the process, we develop a Voronoi-based procedure that allows to identify enough points O(( n/n)2/(d+1))-close to ∂ M for reconstructing it.