On singular integrals with non-negative kernels in the Heisenberg group

Abstract

In this paper we revisit nonnegative kernels in the first Heisenberg group , and in particular we further study the family Kα(x,y,z)= |z|α/2\|(x,y,z)\|Hα+1, α>0, which was introduced in CL. We first show that if E ⊂ is a 1-Ahlfors regular set and the SIO associated with the kernel K4 is L2(E)-bounded, then E is contained in a 1-Ahlfors regular curve. Combined with the converse implication which was obtained by Fässler and Orponen in FO1dim, our result provides a characterization of uniform 1-rectifiability in the Heisenberg group via the L2-boundedness of a singular integral. We also give a negative answer to a question of Fässler and Orponen from FO1dim by showing that for any α∈ (0,2) there exists a 1-Ahlfors regular curve Ea such that the operators associated with the kernels Kα are not bounded in L2(Eα). We finally show that there exists a 1-Ahlfors regular and purely 1-unrectifiable set E such that the singular integral associated with |x| \|(x,y,z)\|-2 is L2(E) -bounded.