Projections of Poisson cut-outs in the Heisenberg group and the visual 3-sphere

Abstract

We study projectional properties of Poisson cut-out sets E in non-Euclidean spaces. In the first Heisenbeg group, endowed with the Kor\'anyi metric, we show that the Hausdorff dimension of the vertical projection π(E) (projection along the center of the Heisenberg group) almost surely equals \2,dimH(E)\ and that π(E) has non-empty interior if dimH(E)>2. As a corollary, this allows us to determine the Hausdorff dimension of E with respect to the Euclidean metric in terms of its Heisenberg Hausdorff dimension dimH (E). We also study projections in the one-point compactification of the Heisenberg group, that is, the 3-sphere S3 endowed with the visual metric d obtained by identifying S3 with the boundary of the complex hyperbolic plane. In S3, we prove a projection result that holds simultaneously for all radial projections (projections along so called "chains"). This shows that the Poisson cut-outs in S3 satisfy a strong version of the Marstrand's projection theorem, without any exceptional directions.