English

Open strings on knot complements

High Energy Physics - Theory 2026-02-02 v1 Geometric Topology Symplectic Geometry

Abstract

Using skein valued holomorphic curve counting techniques, we give a flow loop formula for the skein valued partition function of the Lagrangian knot complement of a fibered knot (of the AA-model open topological strings with Lagrangian AA-branes wrapping the complement) in the cotangent bundle of the three-sphere and in the resolved conifold. For torus knots we show that the partition function in the cotangent bundle localizes on two or three holomorphic annuli and give a corresponding generalized quiver structure for the partition function in the resolved conifold. We connect the formula to the augmentation curve, the representation variety of the knot contact homology algebra of the knot, generated by Reeb chords of its Legendrian conormal and with differential given by holomorphic disks interpolating between words of Reeb chords. The curve admits a quantization as a qq-difference equation for the generating function of symmetrically colored HOMFLYPT-polynomials of the knot or, geometrically, for the U(1)U(1)-partition function of the knot conormal. For (2,2p+1)(2,2p+1)-torus knots we show that, after a change of variables, the partition function of the knot complement also satisfies this qq-difference equation. This gives another geometrically defined coordinate chart for the DD-module defined by the quantized augmentation polynomial.

Keywords

Cite

@article{arxiv.2601.22922,
  title  = {Open strings on knot complements},
  author = {Sachin Chauhan and Tobias Ekholm and Pietro Longhi},
  journal= {arXiv preprint arXiv:2601.22922},
  year   = {2026}
}

Comments

50 pages

R2 v1 2026-07-01T09:27:42.373Z