Submanifolds of class C1,α and sets with positive μ-reach

Abstract

It is well-known since the seminal work of Herbert Federer [Trans. of the AMS, 1959] that submanifolds of class C1,1 have positive reach. In this paper, we extend this property to less regular submanifolds by using the notion of μ-reach that was introduced in the 2000's. We first show that every compact C1 submanifold of the Euclidean space n has positive μ-reach for all μ<1. We then show that intermediate regularities C1,α induce more quantitative results on the norm \|∇ M\| of the generalized gradient of the distance function~M to the submanifold. More precisely, if M⊂ n is a submanifold of class C1,α, with α<1, then there exists a constant C>0 such that ∀ p∈n M, 1 - \| ∇ M(p) \|2 ≤ C ~ M(p)2 α1- α. We finally show that the exponent 2α/(1-α) in this estimate is sharp.