Universal Differentiability Sets in Carnot Groups of Arbitrarily High Step

Abstract

We show that every model filiform group En contains a measure zero set N such that every Lipschitz map f En R is differentiable at some point of N. Model filiform groups are a class of Carnot groups which can have arbitrarily high step. Essential to our work is the question of whether existence of an (almost) maximal directional derivative Ef(x) in a Carnot group implies differentiability of a Lipschitz map f at x. We show that such an implication is valid in model Filiform groups except for a one-dimensional subspace of horizontal directions. Conversely, we show that this implication fails for every horizontal direction in the free Carnot group of step three and rank two.