English

A dequantized metaplectic knot invariant

Geometric Topology 2017-04-25 v1 Mathematical Physics math.MP Quantum Algebra

Abstract

Let KS3K\subset S^3 be a knot, X:=S3KX:= S^3\setminus K its complement, and T\mathbb{T} the circle group identified with R/Z\mathbb{R}/\mathbb{Z}. To any oriented long knot diagram of KK, we associate a quadratic polynomial in variables bijectively associated with the bridges of the diagram such that, when the variables projected to T\mathbb{T} satisfy the linear equations characterizing the first homology group H1(X~2)H_1(\tilde{X}_2) of the double cyclic covering of XX, the polynomial projects down to a well defined T\mathbb{T}-valued function on T1(X~2,T)T^1(\tilde{X}_2,\mathbb{T}) (the dual of the torsion part T1T_1 of H1H_1). This function is sensitive to knot chirality, for example, it seems to confirm chirality of the knot 107110_{71}. It also distinguishes the knots 747_4 and 929_2 known to have identical Alexander polynomials and the knots 929_2 and K11n13 known to have identical Jones polynomials but does not distinguish 747_4 and K11n13.

Keywords

Cite

@article{arxiv.1704.07206,
  title  = {A dequantized metaplectic knot invariant},
  author = {Rinat Kashaev},
  journal= {arXiv preprint arXiv:1704.07206},
  year   = {2017}
}

Comments

8 pages

R2 v1 2026-06-22T19:25:42.513Z