We study focus-focus singularities (also known as nodal singularities, or pinched tori)
of Lagrangian fibrations on symplectic 4-manifolds. We show that, in contrast to elliptic and hyperbolic singularities, there exist homeomorphic focus-focus singularities which are not diffeomorphic. Furthermore, we obtain an algebraic description of the moduli space of focus-focus singularities up to smooth equivalence, and show that for double pinched
tori this space is one-dimensional. Finally, we apply our construction to disprove Zung’s
conjecture which says that any non-degenerate singularity can be smoothly decomposed into an almost direct product of standard singularities.
History
School
Science
Department
Mathematical Sciences
Published in
Journal of Symplectic Geometry
Volume
17
Issue
6
Pages
1613 - 1648
Citation
BOLSINOV, A.V. and IZOSIMOV, A., 2019. Smooth invariants of focus-focus singularities and obstructions to product decomposition. Journal of Symplectic Geometry, 17 (6), pp.1613-1648.
Publisher
International Press
Version
AM (Accepted Manuscript)
Publisher statement
This paper was accepted for publication in the journal Journal of Symplectic Geometry and the definitive published version is available at https://dx.doi.org/10.4310/JSG.2019.v17.n6.a2.