A varifold-type estimation for data sampled on a rectifiable set

Abstract

We investigate the inference of varifold structures in a statistical framework: assuming that we have access to i.i.d. samples in Rn obtained from an underlying d--dimensional shape S endowed with a possibly non uniform density θ, we propose and analyse an estimator of the varifold structure associated to S. The shape S is assumed to be piecewise C1,a in a sense that allows for a singular set whose small enlargements are of small d--dimensional measure. The estimators are kernel--based both for infering the density and the tangent spaces and the convergence result holds for the bounded Lipschitz distance between varifolds, in expectation and in a noiseless model. The mean convergence rate involves the dimension d of S, its regularity through a ∈ (0, 1] and the regularity of the density θ.