On Boundaries of -neighbourhoods of Planar Sets: Singularities, Global Structure, and Curvature

Abstract

We study the geometry, topological properties and smoothness of the boundaries of closed -neighbourhoods E = \x ∈ R2 \, : \, dist(x, E) ≤ \ of compact planar sets E ⊂ R2. We develop a novel technique for analysing the boundary, and use this to obtain a classification of singularities (i.e.~non-smooth points) on ∂ E into eight categories. We show that the set of singularities is either countable or the disjoint union of a countable set and a closed, totally disconnected, nowhere dense set. Furthermore, we characterise, in terms of local geometry, those -neighbourhoods whose complement R2 E is a set with positive reach. It is known that for all bounded E ⊂ Rd and all > 0, the boundary ∂ E is (d-1)-rectifiable. Improving on this, we identify a sufficient condition for the boundary to be uniformly rectifiable, and provide an example of a planar -neighbourhood that is not Ahlfors regular. In terms of the topological structure, we show that for a compact set E and > 0 the boundary ∂ E can be expressed as a disjoint union of an at most countably infinite union of Jordan curves and a possibly uncountable, totally disconnected set of singularities. Finally, we show that curvature is defined almost everywhere on the Jordan curve subsets of the boundary.