Rickman rugs and intrinsic bilipschitz graphs

Abstract

This paper studies the geometry of bilipschitz maps f W H, where H is the first Heisenberg group, and W ⊂ H is a vertical subgroup of co-dimension 1. The images f(W) of such maps are called Rickman rugs in the Heisenberg group. The main theorem states that a Rickman rug in the Heisenberg group admits a corona decomposition by intrinsic bilipschitz graphs. As a corollary, Rickman rugs are countably rectifiable by intrinsic bilipschitz graphs. Here, an intrinsic bilipschitz graph is an intrinsic Lipschitz graph, which is simultaneously a Rickman rug. General intrinsic Lipschitz graphs need not be Rickman rugs, even locally, by an example of Bigolin and Vittone.