Extensions and corona decompositions of low-dimensional intrinsic Lipschitz graphs in Heisenberg groups

Abstract

This note concerns low-dimensional intrinsic Lipschitz graphs, in the sense of Franchi, Serapioni, and Serra Cassano, in the Heisenberg group Hn, n∈ N. For 1≤ k≤ n, we show that every intrinsic L-Lipschitz graph over a subset of a k-dimensional horizontal subgroup V of Hn can be extended to an intrinsic L'-Lipschitz graph over the entire subgroup V, where L' depends only on L, k, and n. We further prove that 1-dimensional intrinsic 1-Lipschitz graphs in Hn, n∈ N, admit corona decompositions by intrinsic Lipschitz graphs with smaller Lipschitz constants. This complements results that were known previously only in the first Heisenberg group H1. The main difference to this case arises from the fact that for 1≤ k<n, the complementary vertical subgroups of k-dimensional horizontal subgroups in Hn are not commutative.