Compensated Convexity, Multiscale Medial Axis Maps and Sharp Regularity of the Squared Distance Function

Abstract

We introduce a new stable mathematical model for locating and measuring the medial axis of geometric objects, called the quadratic multiscale medial axis map of scale λ, and prove a sharp regularity result for the squared-distance function to any closed non-empty subset K of Rn. Our results exploit properties of the function Clλ(dist2(·;\, K)) obtained by applying the quadratic lower compensated convex transform of parameter λ to dist2(·;\, K), the Euclidean squared-distance function to K. Using an estimate for the tight approximation of dist2(·;\, K) by Clλ(dist2(·;\, K)), we prove C1,1-regularity of dist2(·;\, K) outside a neighbourhood of the closure of the medial axis MK of K, and give an asymptotic formula for Clλ(dist2(·;\, K)) in terms of the scaled squared distance to K and to the convex hull of the set of points that realize the minimum distance to K. The multiscale medial axis map, Mλ(·;\, K), is a family of non-negative functions whose limit as λ ∞ exists and is called the multiscale medial axis landscape map, M∞(·;\, K). We show M∞(·;\, K) is strictly positive on the medial axis MK and zero elsewhere. We give conditions to ensure Mλ(·;\, K) keeps a constant height along parts of MK generated by two-point subsets with the height dependent on the distance between the generating points, so giving a hierarchy between different parts of MK that enables subsets of MK to be selected by thresholding. Given a compact subset K of Rn, while it is well known that MK is not Hausdorff stable, we prove Mλ(·;\, K) is stable under Hausdorff distance, and deduce implications for localization of the stable parts of MK. Examples are included.