Geometric Hardy inequalities on the Heisenberg groups via convexity

Abstract

We prove Lp-Hardy inequalities with distance to the boundary for domains in the Heisenberg group Hn, n≥ 1. Our results are based on a certain geometric condition. This is first implemented for the Euclidean distance in certain non-convex domains. It is then implemented for the distance defined by the gauge quasi-norm related to the fundamental solution of the horizontal Laplacian when the domain is a half-space or a convex polytope. Finally it is implemented for the Carnot-Carath\'eodory distance on half-spaces and arbitrary bounded convex domains of Hn. In all cases the constant ((p-1)/p)p is obtained. In the more general context of a stratified Lie group of step two we study the superharmonicity and the weak H-concavity of the Euclidean distance to the boundary, thus obtaining a proof of the Lp-Hardy inequality on convex domains.

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