Rigidity of Kleinian groups via self-joinings: measure theoretic criterion

TL;DR

This paper establishes a measure-theoretic criterion for the rigidity of Kleinian groups, showing a dichotomy based on the structure of certain limit sets and their images under boundary maps, using ergodic and conformal measure theories.

Contribution

It introduces a new measure-theoretic criterion for Kleinian group rigidity, linking boundary map properties to group conjugation and dimension theory, with applications to divergence-type subgroups.

Findings

Dichotomy: either the boundary map's image covers the entire limit set or has zero Hausdorff measure.

When the boundary map's image covers the entire limit set, the groups are conjugate via a Möbius transformation.

The proof employs ergodic theory of directional flows and conformal measures on higher rank Lie groups.

Abstract

Let $n, m\ge 2$. Let $\Gamma<\text{SO}^\circ(n+1,1)$ be a Zariski dense convex cocompact subgroup and $\Lambda\subset\mathbb{S}^n$ be its limit set. Let $\rho : \Gamma \to \text{SO}^\circ(m+1,1)$ be a Zariski dense convex cocompact faithful representation and $f:\Lambda\to \mathbb{S}^{m}$ the $\rho$-boundary map. Let $$\Lambda_f:= \bigcup \left\{ C \cap \Lambda : \begin{matrix} C \subset \mathbb{S}^n \text{ is a circle such that} \\ f(C \cap \Lambda) \text{ is contained in a proper sphere } \text{in } \mathbb{S}^m \end{matrix} \right\}.$$ When there exists at least one $\Lambda$-doubly stable circle in $\mathbb{S}^n$ (e.g., $\Omega=\mathbb{S}^n-\Lambda$ is disconnected), we prove the following dichotomy: $$\text{either}\quad \Lambda_f= \Lambda \quad \text{ or } \quad \mathcal{H}^{\delta}(\Lambda_f) =0,$$ where $\mathcal{H}^\delta$ is the Hausdorff measure of dimension $\delta=\dim_H \Lambda$. Moreover, in the former case, we have $n=m$ and $\rho$ is a conjugation by a M\"obius transformation on $\mathbb{S}^n$. Our proof uses ergodic theory for directional diagonal flows and conformal measure theory of discrete subgroups of higher rank semisimple Lie groups, applied to the self-joining subgroup $\Gamma_\rho=(\operatorname{id} \times \rho)(\Gamma) < \text{SO}^\circ(n+1,1)\times \text{SO}^\circ(m+1,1)$. We also obtain an analogous theorem for any divergence-type subgroup.