English

On webs in quantum type $C$

Quantum Algebra 2020-06-05 v1 Geometric Topology Representation Theory

Abstract

We study webs in quantum type CC, focusing on the rank three case. We define a linear pivotal category Web(sp6)\mathbf{Web}(\mathfrak{sp}_6) diagrammatically by generators and relations, and conjecture that it is equivalent to the category FundRep(Uq(sp6))\mathbf{FundRep}(U_q(\mathfrak{sp}_6)) of quantum sp6\mathfrak{sp}_6 representations generated by the fundamental representations, for generic values of the parameter qq. We prove a number of results in support of this conjecture, most notably that there is a full, essentially surjective functor Web(sp6)FundRep(Uq(sp6))\mathbf{Web}(\mathfrak{sp}_6) \rightarrow \mathbf{FundRep}(U_q(\mathfrak{sp}_6)), that all Hom\mathrm{Hom}-spaces in Web(sp6)\mathbf{Web}(\mathfrak{sp}_6) are finite-dimensional, and that the endomorphism algebra of the monoidal unit in Web(sp6)\mathbf{Web}(\mathfrak{sp}_6) is 11-dimensional. The latter corresponds to the statement that all closed webs can be evaluated to scalars using local relations; as such, we obtain a new approach to the quantum sp6\mathfrak{sp}_6 link invariants, akin to the Kauffman bracket description of the Jones polynomial.

Keywords

Cite

@article{arxiv.2006.02491,
  title  = {On webs in quantum type $C$},
  author = {David E. V. Rose and Logan Tatham},
  journal= {arXiv preprint arXiv:2006.02491},
  year   = {2020}
}

Comments

34 pages, many color figures

R2 v1 2026-06-23T16:02:20.086Z