Remainder terms and sharp quantitative stability for a nonlocal Sobolev inequality on the Heisenberg group

TL;DR

This paper investigates a nonlocal Sobolev inequality on the Heisenberg group, establishing remainder terms and stability results for critical points, especially in the multi-bubble case, extending understanding of stability in nonlocal geometric inequalities.

Contribution

It introduces a gradient-type remainder term for the nonlocal Sobolev inequality on the Heisenberg group and proves quantitative stability of critical points in specific cases.

Findings

Existence of a gradient-type remainder term for the inequality when Q≥4 and μ∈(0,4].

Derivation of a remainder term in the weak L^{Q/(Q-2)}-norm on bounded domains.

Quantitative stability of critical points in the multi-bubble case for Q=4 and μ∈(2,4).

Abstract

In this paper, we study the following nonlocal Sobolev inequality on the Heisenberg group \begin{equation}\label{eq:HLS} S_{HL}(Q,\mu) \left(\int_{\mathbb{H}^{n}}\int_{\mathbb{H}^{n}}\frac{|u(\xi)|^{Q^{\ast}_{\mu}}|u(\eta)|^{Q^{\ast}_{\mu}}}{|\eta^{-1}\xi|^{\mu}}{d}\xi{d}\eta\right)^{\frac{1}{Q^{\ast}_{\mu}}}\leq \int_{\mathbb{H}^{n}}|\nabla_{\mathbb{H}}u|^{2}d\xi,\quad \forall \, u\in S^{1,2}(\mathbb{H}^{n}), \end{equation} where $Q=2n+2$ is the homogeneous dimension of the Heisenberg group $\mathbb{H}^{n}$, $n\geq1$, $\mu\in(0,Q)$, $Q^{\ast}_{\mu}=\frac{2Q-\mu}{Q-2}$ is the upper critical exponent in the sense of the Hardy-Littlewood-Sobolev inequality and the Folland-Stein-Sobolev inequality on the Heisenberg group, $S_{HL}(Q,\mu)$ is the sharp constant of \eqref{eq:HLS}, and $S^{1,2}(\mathbb{H}^{n})$ is the Folland-Stein-Sobolev space. %of the nonlocal-Sobolev inequality. It is well-known that, up to a translation and suitable scaling, \begin{equation}\label{eq:abs} -\Delta_{\mathbb{H}} u=\left(\int_{\mathbb{H}^{n}}\frac{|u(\eta)| ^{Q^{\ast}_{\mu}}}{|\eta^{-1}\xi|^{\mu}}{d}\eta\right)|u|^{Q_\mu^*-2}u,~~u\in S^{1,2}(\mathbb{H}^{n}) \end{equation} is the Euler-Lagrange equation corresponding to the associated minimization problem. On the one hand, we show the existence of a gradient-type remainder term for inequality \eqref{eq:HLS} when $Q\geq4$, $\mu\in (0,4]$, and as a corollary, derive the existence of a remainder term in the weak $L^{\frac{Q}{Q-2}}$-norm on bounded domains. On the other hand, we establish the quantitative stability of critical points for equation \eqref{eq:abs} in the multi-bubble case when $Q=4$ and $\mu\in (2,4)$.