Contents Online
Journal of Symplectic Geometry
Volume 8 (2010)
Number 2
Almost toric symplectic four-manifolds
Pages: 143 – 187
DOI: https://dx.doi.org/10.4310/JSG.2010.v8.n2.a2
Authors
Abstract
Almost toric manifolds form a class of singular Lagrangian fibered symplectic manifolds that include both toric manifolds and the K3 surface. We classify closed almost toric four-manifolds up to diffeomorphism and indicate precisely the structure of all almost toric fibrations of closed symplectic four-manifolds. A key step in the proof is a geometric classification of the singular integral affine structures that can occur on the base of an almost toric fibration of a closed four-manifold. As a byproduct we provide a geometric explanation for why a generic Lagrangian fibration over the two-sphere must have 24 singular fibers.
Published 1 January 2010