Density Level Set Estimation on Manifolds with DBSCAN

Abstract

We show that DBSCAN can estimate the connected components of the λ-density level set \ x : f(x) λ\ given n i.i.d. samples from an unknown density f. We characterize the regularity of the level set boundaries using parameter β > 0 and analyze the estimation error under the Hausdorff metric. When the data lies in RD we obtain a rate of O(n-1/(2β + D)), which matches known lower bounds up to logarithmic factors. When the data lies on an embedded unknown d-dimensional manifold in RD, then we obtain a rate of O(n-1/(2β + d· \1, β \)). Finally, we provide adaptive parameter tuning in order to attain these rates with no a priori knowledge of the intrinsic dimension, density, or β.