A sequence in the classical Schottky space (Q1598263)

The main result of this paper is as follows: Let \(r\in\mathbb{N}\), \(r>1\). If a sequence \((\theta_n)\) in classical Schottky space \(\mathbb{S}^0_r\) converges to \(\theta\in \partial\mathbb{S}_r\cap \overline{\mathbb{S}^0_r}\), then the multiplier \(\lambda(\theta_n \circ\theta^{-1}(\varphi))\) converges to 1 conically for each parabolic transformation \(\varphi\) of \(\text{Im} \varphi\).