The Lusin theorem and horizontal graphs in the Heisenberg group

Abstract

In this paper we prove that every collection of measurable functions fα, |α|=m coincides a.e. with mth order derivatives of a function g∈ Cm-1 whose derivatives of order m-1 may have any modulus of continuity weaker than that of a Lipschitz function. This is a stronger version of earlier results of Lusin, Moonens-Pfeffer and Francos. As an application we construct surfaces in the Heisenberg group with tangent spaces being horizontal a.e.