A Hardy Inequality for subelliptic operators with global fundamental solution, and an application to Unique Continuation

TL;DR

This paper generalizes Hardy's inequality to a broad class of degenerate elliptic operators with a global fundamental solution and applies it to establish unique continuation properties for solutions of related PDEs on homogeneous Lie groups.

Contribution

It introduces a Hardy inequality for subelliptic operators with a global fundamental solution and uses it to prove unique continuation results for PDEs on homogeneous Lie groups.

Findings

Established a Hardy inequality for subelliptic operators with global fundamental solutions.

Derived unique continuation results for PDEs involving these operators.

Extended classical inequalities to more general degenerate elliptic operators.

Abstract

This is a chapter from PhD Thesis by Stefano Biagi (advisor: prof. A. Bonfiglioli). We overview existing results showing that it is possible to generalize the classical Hardy's Inequality to more general linear partial differential operators (PDOs, in the sequel), possibly degenerate-elliptic, of the following quasi-divergence form $$ \mathcal{L} = \frac{1}{w(x)}\sum_{i = 1}^N\frac{\partial}{\partial x_i} \left(\sum_{j = 1}^Nw(x)a_{ij}(x)\frac{\partial}{\partial x_j}\right), \quad x \in \mathbb{R}^N, $$ where $w \in C^{\infty}(\mathbb{R}^N,\mathbb{R})$ is a (smooth and) strictly positive function on the whole of $\mathbb{R}^N$ and $A(x) := \begin{pmatrix}a_{ij}(x) \end{pmatrix}$ is a symmetric and positive semi-definite $N\times N$ matrix with real $C^{\infty}$ entries. From such a inequality, it has been derived a result of unique continuation for the solutions of the equation $$ -\mathcal{L} u + Vu = 0, $$ where $\mathcal{L}$ is a left-invariant homogeneous PDO on a homogeneous Lie group $\mathbb{G}$ and $V$ is real-valued function defined on $\mathbb{G}$ and continuous on $\mathbb{G}\setminus\{0\}$.