On sets where lip f is finite

Abstract

Given a function f R R, the so-called "little lip" function lip f is defined as follows: equation* lip f(x)=r 0|x-y| r |f(y)-f(x)|r. equation* We show that if f is continuous on R, then the set where lip f is infinite is a countable union of a countable intersection of closed sets (that is an Fσ δ set). On the other hand, given a countable union of closed sets E, we construct a continuous function f such that lip f is infinite exactly on E. A further result is that for the typical continuous function f on the real line lip f vanishes almost everywhere.