English

Tangle Functors from Semicyclic Representations

Geometric Topology 2016-07-08 v1

Abstract

Let qq be a 2N2Nth root of unity where NN is odd. Let Uq(sl2)U_q(sl_2) denote the quantum group with large center corresponding to the lie algebra sl2sl_2 with generators E,F,KE,F,K, and K1K^{-1}. A semicyclic representation of Uq(sl2)U_q(sl_2) is an NN-dimensional irreducible representation ρ:Uq(sl2)MN(C)\rho:U_q(sl_2)\rightarrow M_N(\mathbb{C}), so that ρ(EN)=aId\rho(E^N)=aId with a0a\neq 0, ρ(FN)=0\rho(F^N)=0 and ρ(KN)=Id\rho(K^N)=Id. We construct a tangle functor for framed homogeneous tangles colored with semicyclic representations, and prove that for (1,1)(1,1)-tangles coming from knots, the invariant defined by the tangle functor coincides with Kashaev's invariant.

Keywords

Cite

@article{arxiv.1607.02070,
  title  = {Tangle Functors from Semicyclic Representations},
  author = {Nathan Druivenga and Charles Frohman and Sanjay Kumar},
  journal= {arXiv preprint arXiv:1607.02070},
  year   = {2016}
}

Comments

18 pages, 9 figures

R2 v1 2026-06-22T14:48:24.567Z