Cantor sets of low density and Lipschitz functions on C1 curves

Abstract

We characterize the functions f [0,1] [0,1] for which there exists a measurable set C⊂eq [0,1] of positive measure satisfying |C I||I|<f(|I|) for any nontrivial interval I ⊂eq [0,1]. As an application, we prove that on any C1 curve it is possible to construct a Lipschitz function that cannot be approximated by Lipschitz functions attaining their Lipschitz constant.