English

Legendrian DGA Representations and the Colored Kauffman Polynomial

Symplectic Geometry 2020-03-24 v2 Geometric Topology Quantum Algebra

Abstract

For any Legendrian knot KK in standard contact R3{\mathbb R}^3 we relate counts of ungraded (11-graded) representations of the Legendrian contact homology DG-algebra (A(K),)(\mathcal{A}(K),\partial) with the nn-colored Kauffman polynomial. To do this, we introduce an ungraded nn-colored ruling polynomial, Rn,K1(q)R^1_{n,K}(q), as a linear combination of reduced ruling polynomials of positive permutation braids and show that (i) Rn,K1(q)R^1_{n,K}(q) arises as a specialization Fn,K(a,q)a1=0F_{n,K}(a,q)\big|_{a^{-1}=0} of the nn-colored Kauffman polynomial and (ii) when qq is a power of two Rn,K1(q)R^1_{n,K}(q) agrees with the total ungraded representation number, Rep1(K,Fqn)\operatorname{Rep}_1\big(K, \mathbb{F}_q^n\big), which is a normalized count of nn-dimensional representations of (A(K),)(\mathcal{A}(K),\partial) over the finite field Fq\mathbb{F}_q. This complements results from [Leverson C., Rutherford D., Quantum Topol. 11 (2020), 55-118, arXiv:1802.10531] concerning the colored HOMFLY-PT polynomial, mm-graded representation numbers, and mm-graded ruling polynomials with m1m \neq 1.

Keywords

Cite

@article{arxiv.1908.08978,
  title  = {Legendrian DGA Representations and the Colored Kauffman Polynomial},
  author = {Justin Murray and Dan Rutherford},
  journal= {arXiv preprint arXiv:1908.08978},
  year   = {2020}
}
R2 v1 2026-06-23T10:55:30.543Z