Foliated corona decompositions

Abstract

We prove that the L4 norm of the vertical perimeter of any measurable subset of the 3-dimensional Heisenberg group H is at most a universal constant multiple of the (Heisenberg) perimeter of the subset. We show that this isoperimetric-type inequality is optimal in the sense that there are sets for which it fails to hold with the L4 norm replaced by the Lq norm for any q<4. This is in contrast to the 5-dimensional setting, where the above result holds with the L4 norm replaced by the L2 norm. The proof of the aforementioned isoperimetric inequality introduces a new structural methodology for understanding the geometry of surfaces in H. In previous work (2017) we showed how to obtain a hierarchical decomposition of Ahlfors-regular surfaces into pieces that are approximately intrinsic Lipschitz graphs. Here we prove that any such graph admits a foliated corona decomposition, which is a family of nested partitions into pieces that are close to ruled surfaces. Apart from the intrinsic geometric and analytic significance of these results, which settle questions posed by Cheeger-Kleiner-Naor (2009) and Lafforgue-Naor (2012), they have several noteworthy implications, including the fact that the L1 distortion of a word-ball of radius n 2 in the discrete 3-dimensional Heisenberg group is bounded above and below by universal constant multiples of [4] n; this is in contrast to higher dimensional Heisenberg groups, where our previous work showed that the distortion of a word-ball of radius n 2 is of order n.