English

Parabolic representations and generalized Riley polynomials

Geometric Topology 2022-05-11 v2

Abstract

We generalize R. Riley's study about parabolic representations of two bridge knot groups to the general knots in S3S^3. We utilize the parabolic quandle method for general knot diagrams and adopt symplectic quandle for better investigation, which gives such representations and their complex volumes explicitly. For any knot diagram with a specified crossing cc, we define a generalized Riley polynomial Rc(y)Q[y]R_c(y) \in \mathbb{Q}[y] whose roots correspond to the conjugacy classes of parabolic representations of the knot group. The sign-type of parabolic quandle is newly introduced and we obtain a formula for the obstruction class to lift to a boundary unipotent SL2C\text{SL}_2 \mathbb{C}-representation. Moreover, we define another polynomial gc(u)Q[u]g_c(u)\in\mathbb{Q}[u], called uu-polynomial, and prove that Rc(u2)=±gc(u)gc(u)R_c(u^2)=\pm g_c(u)g_c(-u). Based on this result, we introduce and investigate Riley field and uu-field which are closely related to the invariant trace field. This method eventually leads to the complete classification of parabolic representations of knot groups along with their complex volumes and cusp shapes up to 12 crossings.

Cite

@article{arxiv.2204.00319,
  title  = {Parabolic representations and generalized Riley polynomials},
  author = {Yunhi Cho and Hyuk Kim and Seonhwa Kim and Seokbeom Yoon},
  journal= {arXiv preprint arXiv:2204.00319},
  year   = {2022}
}

Comments

Including Mathematica notebook files for example computation

R2 v1 2026-06-24T10:34:28.899Z