Existence, Uniqueness and Regularity of the Projection onto Differentiable Manifolds

Abstract

We investigate the maximal open domain E(M) on which the orthogonal projection map p onto a subset M⊂eq Rd can be defined and study essential properties of p. We prove that if M is a C1 submanifold of Rd satisfying a Lipschitz condition on the tangent spaces, then E(M) can be described by a lower semi-continuous frontier function. We show that this frontier function is continuous if M is C2 or if the topological skeleton of Mc is closed and we provide an example showing that the frontier function need not be continuous in general. We demonstrate that, for a Ck-submanifold M with k 2, the projection map is Ck-1 on E(M), and we obtain a differentiation formula for the projection map which is used to discuss boundedness of its higher order derivatives on tubular neighborhoods. A sufficient condition for the inclusion M⊂eqE(M) is that M is a C1 submanifold whose tangent spaces satisfy a local Lipschitz condition. We prove in a new way that this condition is also necessary. More precisely, if M is a topological submanifold with M⊂eqE(M), then M must be C1 and its tangent spaces satisfy the same local Lipschitz condition. A final section is devoted to highlighting some relations between E(M) and the topological skeleton of Mc.