Characterization of lip sets

Abstract

We denote the local ``little" Lipschitz constant of a function f: R R by lipf. In this paper we settle the following question: For which sets E ⊂ R is it possible to find a continuous function f such that lipf=1 E? In an earlier paper we introduced the concept of strongly one-sided dense sets. Our main result characterizes lip1 sets as countable unions of closed sets which are strongly one-sided dense. We also show that a stronger statement is not true i.e. there are strongly one-sided dense F σ sets which are not lip1.