The Riesz tranform on intrinsic Lipschitz graphs in the Heisenberg group

Abstract

We prove that the Heisenberg Riesz transform is L2--unbounded on a family of intrinsic Lipschitz graphs in the first Heisenberg group H. We construct this family by combining a method from NY2 with a stopping time argument, and we establish the L2--unboundedness of the Riesz transform by introducing several new techniques to analyze singular integrals on intrinsic Lipschitz graphs. These include a formula for the Riesz transform in terms of a singular integral on a vertical plane and bounds on the flow of singular integrals that arises from a perturbation of a graph. On the way, we use our construction to show that the strong geometric lemma fails in H for all exponents in [2,4). Our results are in stark contrast to two fundamental results in Euclidean harmonic analysis and geometric measure theory: Lipschitz graphs in Rn satisfy the strong geometric lemma, and the m--Riesz transform is L2--bounded on m--dimensional Lipschitz graphs in Rn for m∈ (0,n).

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