Hausdorff dimension of directional limit sets for self-joinings of hyperbolic manifolds

TL;DR

This paper extends classical results on Hausdorff dimensions of limit sets for convex cocompact groups to self-joinings, establishing formulas for the dimension of limit sets and directional limit sets in hyperbolic manifolds.

Contribution

It generalizes the Hausdorff dimension formula to self-joinings of convex cocompact groups and analyzes the dimensions of directional limit sets.

Findings

Hausdorff dimension of limit set equals the maximum critical exponent among factors.

Dimension of directional limit sets bounded by growth indicator function ratios for k ≤ 3.

Established dimension formulas for complex self-joining subgroups in hyperbolic geometry.

Abstract

The classical result of Patterson and Sullivan says that for a non-elementary convex cocompact subgroup $\Gamma<\text{SO}^\circ (n,1)$, $n\ge 2$, the Hausdorff dimension of the limit set of $\Gamma$ is equal to the critical exponent of $\Gamma$. In this paper, we generalize this result for self-joinings of convex cocompact groups in two ways. Let $\Delta$ be a finitely generated group and $\rho_i:\Delta\to \text{SO}^\circ(n_i,1)$ be a convex cocompact faithful representation of $\Delta$ for $1\le i\le k$. Associated to $\rho=(\rho_1, \cdots, \rho_k)$, we consider the following self-joining subgroup of $\prod_{i=1}^k \text{SO}(n_i,1)$: $$\Gamma=\left(\prod_{i=1}^k\rho_i\right)(\Delta)=\{(\rho_1(g), \cdots, \rho_k(g)):g\in \Delta\} .$$ (1). Denoting by $\Lambda\subset \prod_{i=1}^k \mathbb{S}^{n_i-1}$ the limit set of $\Gamma$, we first prove that $$\text{dim}_H \Lambda=\max_{1\le i\le k} \delta_{\rho_i}$$ where $\delta_{\rho_i}$ is the critical exponent of the subgroup $\rho_{i}(\Delta)$. (2). Denoting by $\Lambda_u\subset \Lambda$ the $u$-directional limit set for each $u=(u_1, \cdots, u_k)$ in the interior of the limit cone of $\Gamma$, we obtain that for $k\le 3$, $$ \frac{\psi_\Gamma(u)}{\max_i u_i }\le \text{dim}_H \Lambda_u \le \frac{\psi_\Gamma(u)}{\min_i u_i }$$ where $\psi_\Gamma:\mathbb{R}^k\to \mathbb{R}\cup\{-\infty\}$ is the growth indicator function of $\Gamma$.