Non-Asymptotic Rates for Manifold, Tangent Space, and Curvature Estimation

Abstract

Given an n-sample drawn on a submanifold M ⊂ RD, we derive optimal rates for the estimation of tangent spaces T\X M, the second fundamental form II\XM, and the submanifold M.After motivating their study, we introduce a quantitative class of Ck-submanifolds in analogy with H\"older classes.The proposed estimators are based on local polynomials and allow to deal simultaneously with the three problems at stake. Minimax lower bounds are derived using a conditional version of Assouad's lemma when the base point X is random.