Singular integrals on regular curves in the Heisenberg group

Abstract

Let H be the first Heisenberg group, and let k ∈ C∞(H \, \, \0\) be a kernel which is either odd or horizontally odd, and satisfies |∇Hnk(p)| ≤ Cn\|p\|-1 - n, p ∈ H \, \, \0\, \, n ≥ 0. The simplest examples include certain Riesz-type kernels first considered by Chousionis and Mattila, and the horizontally odd kernel k(p) = ∇H \|p\|. We prove that convolution with k, as above, yields an L2-bounded operator on regular curves in H. This extends a theorem of G. David to the Heisenberg group. As a corollary of our main result, we infer that all 3-dimensional horizontally odd kernels yield L2 bounded operators on Lipschitz flags in H. This was known earlier for only one specific operator, the 3-dimensional Riesz transform. Finally, our technique yields new results on certain non-negative kernels, introduced by Chousionis and Li.