Characterization of convex domains in \(\mathbb{C}^{2}\) with non-compact automorphism group (Q2400399)

In [Methods Appl. Anal. 21, No. 4, 427--440 (2014; Zbl 1305.32005)], \textit{L. Lee} et al. proved that if \(D \subset \mathbb C^n\) is a bounded convex domain with \(\mathcal C^2\)-boundary and has a sequence \(\{g_j\}_j \subset \text{Aut}(D)\) such that all sequences of points \(\{g_j(z)\}_j\), for \(z \in D\), accumulate non-tangentially to some boundary point, then there is no non-trivial analytic disc in \(\partial D\) passing through any of such limit boundary points. In this paper, the authors improve this result for the case of \(\mathcal C^2\)-bounded convex domains in \(\mathbb C^2\), proving that for such domains the requirement that the convergence is non-tangential can be removed. The proof is obtained using a result by \textit{K.-T. Kim} [Adv. Geom. 4, No. 1, 33--40 (2004; Zbl 1039.32028)], which implies that the considered domains have necessarily also a non-compact \(1\)-parameter group of automorphisms with special properties.