Sections of Lagrangian fibrations on holomorphic symplectic manifolds

Abstract

Let M be a holomorphically symplectic manifold, equipped with a Lagrangian fibration π:\; M X. A degenerate twistor deformation (sometimes also called ``a Tate-Shafarevich twist'') is a family of holomorphically symplectic structures on M parametrized by H1,1(X). All members of this family are equipped with a holomorphic Lagrangian projection to X, and their fibers are isomorphic to the fibers of π. Assume that M is a compact hyperkahler manifold of maximal holonomy, and the general fiber of the Lagrangian projection π is primitive (that is, not divisible) in integer homology. We also assume that π has reduced fibers in codimension 1. Then M has a degenerate twistor deformation M' such that the Lagrangian projection π:\; M' X admits a meromorphic section.