Combinatorial construction of symplectic 6-manifolds via bifibration structures

Abstract

A bifibration structure on a 6-manifold is a map to either the complex projective plane P2 or a P1-bundle over P1, such that its composition with the projection to P1 is a (6-dimensional) Lefschetz fibration/pencil, and its restriction to the preimage of a generic P1-fiber is also a (4-dimensional) Lefschetz fibration/pencil. This object has been studied by Auroux, Katzarkov, Seidel, among others. From a pair consisting of a monodromy representation of a Lefschetz fibration/pencil on a 4-manifold and a relation in a braid group, which are mutually compatible in an appropriate sense, we construct a bifibration structure on a closed symplectic 6-manifold, producing the given compatible pair as its monodromies. We further establish methods for computing topological invariants of symplectic 6-manifolds, including Chern numbers, from compatible pairs. Additionally, we provide an explicit example of a compatible pair, conjectured to correspond to a bifibration structure derived from the degree-2 Veronese embedding of the 3-dimensional complex projective space. This example can be viewed as a higher-dimensional analogue of the lantern relation in the mapping class group of the four-punctured sphere. Our results not only extend the applicability of combinatorial techniques to higher-dimensional symplectic geometry but also offer a unified framework for systematically exploring symplectic 6-manifolds.