Addendum: ``Higher order embeddings of algebraic surfaces of Kodaira dimension zero'' (Q1594993)

In the paper mentioned in the title [\textit{H. Terakawa}, Math. Z. 229, No. 3, 417-433 (1998; Zbl 0935.14005)], the author proved that, if \(S\) is a projective K3 surface and \(L\) is a \(k\)-very ample line bundle on \(S\) with \(L^2\leq 4k+4\), then the general member \(C\in|L|\) is \((\text{Cliff}(C)+ 2)\)-gonal except for the case that \(C\) is a smooth plane quintic. In the paper under review he proves that every general member \(C\in |L|\) is \((\text{Cliff} (C)+2)\)-gonal, precisely: Theorem: Let \(S\) be a projective K3 surface and \(L\) a line bundle on \(S\). If \(L\) is \(k\)-very ample and \(L^2\leq 4k+4\) for an integer \(k\geq 0\), then every smooth curve \(C\in |L|\) is \((\text{Cliff}(C) +2)\)-gonal.