Abstract
We prove geometric $L^p$ versions of Hardy's inequality for the sub-elliptic Laplacian on convex domains $\Omega$ in the Heisenberg group $\mathbb{H}^n$, where convex is meant in the Euclidean sense. When $p=2$ and $\Omega$ is the half-space given by $\langle \xi, \nu\rangle > d$ this generalizes an inequality previously obtained by Luan and Yang. For such $p$ and $\Omega$ the inequality is sharp and takes the form \begin{equation} \int_\Omega |\nabla_{\mathbb{H}^n}u|^2 \, d\xi \geq \frac{1}{4}\int_{\Omega} \sum_{i=1}^n\frac{\langle X_i(\xi), \nu\rangle^2+\langle Y_i(\xi), \nu\rangle^2}{\textrm{dist}(\xi, \partial \Omega)^2}|u|^2\, d\xi, \end{equation} where $\textrm{dist}(\, \cdot\,, \partial \Omega)$ denotes the Euclidean distance from $\partial \Omega$.
Highlights
In [12] Luan and Yang prove the Hardy inequality |∇Hn u|2 dξ ≥ Hn+ |x |2 + t2 |y|2 |u|2 dξ, (1)Communicated by Ari Laptev.S
In this paper we provide a different proof of this inequality, generalize it to any half-space of Hn and use it to obtain a weighted geometric Hardy inequality on a convex domain, where convex is meant in the Euclidean sense
The n-dimensional Heisenberg group, which we denote by Hn, may be described as the set R2n+1 equipped with the group law n ξ ◦ ξ := (x + x, y + y, t + t + 2 (xi yi − xi yi )), i =1 where we use the notation ξ = (x1, . . . , xn, y1, . . . , yn, t) = (x, y, t) ∈ R2n+1
Summary
We call a point ξ0 ∈ M a characteristic point of M if the tangent space Tξ0 M is spanned by {Xi (ξ0), , Yi (ξ0) : 1 ≤ i ≤ n} Even though both δcc and δK appear naturally when considering the geometric structure of Hn these distances can be rather difficult to work with, see for instance the work of Arcozzi and Ferrari [1,2]. 3, we combine our inequalities for half-spaces with a method used by Avkhadiev in the Euclidean setting [3] to obtain an inequality of the form (2) for convex domains in Hn, here convex is meant in the Euclidean sense, and with ρ being a weighted Euclidean distance. |p , where p ≥ 2, dist( · , ∂ ) denotes the Euclidean distance to the boundary of and ν(ξ ) ∈ S2n is such that ξ + dist(ξ, ∂ )ν(ξ ) ∈ ∂
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