On the structure of sets with positive reach

Abstract

We give a complete characterization of compact sets with positive reach (=proximally C1 sets) in the plane and of one-dimensional sets with positive reach in Rd. Further, we prove that if ≠ A⊂ Rd is a set of positive reach of topological dimension 0< k ≤ d, then A has its "k-dimensional regular part" ≠ R ⊂ A which is a k-dimensional "uniform" C1,1 manifold open in A and A R can be locally covered by finitely many (k-1)-dimensional DC surfaces. We also show that if A ⊂ Rd has positive reach, then ∂ A can be locally covered by finitely many semiconcave hypersurfaces.