Local projectivity of Lagrangian fibrations on hyperkähler manifolds (Q2226563)

Let \(f: X\rightarrow B\) be a fibration from a compact connected hyperkähler manifold onto a normal projective variety \(B\). Then each fibre is a Lagrangian subvariety (possibly with several components). In the paper, the author proves \(f\) is locally projective; more precisely, for any \(b\in B\), there exits a Stein open neighborhood \(U\) of \(b\) such that \(f_U: X_{U}\rightarrow U\) is projective. This answers a question of L. Kamenova and strengthens Proposition 2.1 for general fibres in [\textit{F. Campana}, Math. Z. 252, No. 1, 147--156 (2006; Zbl 1104.32008)]. The projectivity of any fibre of \(f\) was also obtained in [\textit{C. Lehn}, Math. Res. Lett. 23, No. 2, 473--497 (2016; Zbl 1344.53058)].