The strong geometric lemma for intrinsic Lipschitz graphs in Heisenberg groups

Abstract

We show that the β--numbers of intrinsic Lipschitz graphs of Heisenberg groups Hn are locally Carleson integrable when n ≥ 2. Our technique relies on a recent Dorronsoro inequality FO as well as a novel slicing argument. A key ingredient in our proof is a Euclidean inequality bounding the β--number of a function on a cube of Rn using the β--number of the restriction of the function to codimension--1 slices of the cube.