On the discriminant locus of a Lagrangian fibration

Abstract: Let X → P n be an irreducible holomorphic symplectic manifold of dimension 2n fibred over P n . Matsushita proved that the generic fibre is a holomorphic Lagrangian abelian variety. In this article we study the discriminant locus ∆ ⊂ P n parametrizing singular fibres. Our main result is a formula for the degree of ∆, leading to bounds on the degree when X is a four-fold.

“…The precise meanings of "rank-one semi-stable degeneration" and "maximal variation" will be made clear in Section 2, and these hypotheses are discussed further in Subsections 4.1 to 4.3. Some restrictions on the types of polarizations that can occur in dimension 2n = 4 were previously found by the author [28]. The idea of the proof is as follows.…”

A finiteness theorem for Lagrangian fibrations

“…The precise meanings of "rank-one semi-stable degeneration" and "maximal variation" will be made clear in Section 2, and these hypotheses are discussed further in Subsections 4.1 to 4.3. Some restrictions on the types of polarizations that can occur in dimension 2n = 4 were previously found by the author [28]. The idea of the proof is as follows.…”

A finiteness theorem for Lagrangian fibrations

“…1. One is to follow [22] where the author works in the compact case, using exact sequences of sheaves. In that case the base is P m rather than C m which gives a non-zero contribution if m > 1.…”

Critical Loci for Higgs Bundles

“…30 and 18 for the Beauville-Mukai and Debarre systems, respectively). For Lagrangian fibrations on smooth holomorphic symplectic man-ifolds, this can be related to topological invariants of the total space X (see [49]), but it is not clear whether the same relation holds for orbifolds.…”

Lagrangian fibrations by Prym varieties