English

Contact structures with singularities: from local to global

Symplectic Geometry 2025-09-01 v6 Dynamical Systems

Abstract

In this article we introduce and analyze in detail singular contact structures, with an emphasis on bmb^m-contact structures, which are tangent to a given smooth hypersurface ZZ and satisfy certain transversality conditions. These singular contact structures are determined by the kernel of non-smooth differential forms, called bmb^m-contact forms, having an associated critical hypersurface ZZ. We provide several constructions, prove local normal forms, and study the induced structure on the critical hypersurface. The topology of manifolds endowed with such singular contact forms are related to smooth contact structures via desingularization. The problem of existence of bmb^m-contact structures on a given manifold is also tackled in this paper. We prove that a connected component of a convex hypersurface of a contact manifold can be realized as a connected component of the critical set of a bmb^m-contact structure. In particular, given an almost contact manifold MM with a hypersurface ZZ, this yields the existence of a b2kb^{2k}-contact structure on MM realizing ZZ as a critical set. As a consequence of the desingularization techniques in [GMW], we prove the existence of folded contact forms on any almost contact manifold.

Keywords

Cite

@article{arxiv.1806.05638,
  title  = {Contact structures with singularities: from local to global},
  author = {Eva Miranda and Cédric Oms},
  journal= {arXiv preprint arXiv:1806.05638},
  year   = {2025}
}

Comments

28 pages, new high dimensional construction added

R2 v1 2026-06-23T02:30:24.294Z