Topology of projective Tate-Shafarevich twists

Abstract

A Tate-Shafarevich twist Xφ B of a fibration X B modifies it by a 1-cocycle of flows of vector fields relative to the base, locally in the analytic topology. Sacc\`a conjectured that the total spaces of two projective Lagrangian fibrations related by such a twist are deformation-equivalent. Assuming that the class of the twist is torsion (which is often equivalent to the twist being realizable in the \'etale topology), we show that there is an isomorphism H(X; Q) H(Xφ; Q) of graded vector spaces that respects (1) the Hodge structures and (2) the Hodge-Riemann pairing. Consequently, the rational Beauville-Bogomolov-Fujiki lattices of these two spaces are Hodge-similar. Assuming further that B is smooth, and both the original fibration and its twist admit C∞-sections, we show Sacc\`a's conjecture using the theory of degenerate twistor deformations.