English

Fillable contact structures from positive surgery

Geometric Topology 2023-01-25 v1 Symplectic Geometry

Abstract

We consider the question of when the operation of contact surgery with positive surgery coefficient, along a knot KK in a contact 3-manifold YY, gives rise to a weakly fillable contact structure. We show that this happens if and only if YY itself is weakly fillable, and KK is isotopic to the boundary of a properly embedded symplectic disk inside a filling of YY. Moreover, if YY' is a contact manifold arising from positive contact surgery along KK, then any filling of YY' is symplectomorphic to the complement of a suitable neighborhood of such a disk in a filling of YY. Using this result we deduce several necessary conditions for a knot in the standard 3-sphere to admit a fillable positive surgery, such as quasipositivity and equality between the slice genus and the 4-dimensional clasp number, and we give a characterization of such knots in terms of a quasipositive braid expression. We show that knots arising as the closure of a positive braid always admit a fillable positive surgery, as do knots that have lens space surgeries, and suitable satellites of such knots. In fact the majority of quasipositive knots with up to 10 crossings admit a fillable positive surgery. On the other hand, in general (strong) quasipositivity, positivity, or Lagrangian fillability need not imply a knot admits a fillable positive contact surgery.

Keywords

Cite

@article{arxiv.2301.10122,
  title  = {Fillable contact structures from positive surgery},
  author = {Thomas Mark and Bülent Tosun},
  journal= {arXiv preprint arXiv:2301.10122},
  year   = {2023}
}
R2 v1 2026-06-28T08:18:49.207Z