Inner Carathédory completeness of Reinhardt domains (Q2568674)

Let \(D\) be a bounded pseudoconvex Reinhardt domain with center \(0\) in \(\mathbb{C}^n\). \textit{S. Fu} [Arch. Math. 63, No. 2, 166--172 (1994; Zbl 0815.32001)] proved that \(D\) is complete (even finitely compact) with respect to its Carathéodory distance provided \(D\) contains a point \(z\) with \(z_j = 0\) whenever \(\bar D\) contains such a point. The author [Proc. Am. Math. Soc. 128, No. 3, 857--864 (2000; Zbl 0939.32025)] established the converse. Now he sharpens this, proving that completeness of \(D\) with respect to its inner Carathéodory distance implies Fu's condition.