Knot polynomial identities and quantum group coincidences

Date

2011

Authors

Morrison, Scott
Peters, Emily
Snyder, Noah

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Volume Title

Publisher

European Mathematical Society Publishing House

Abstract

We construct link invariants using the D2n subfactor planar algebras, and use these to prove new identities relating certain specializations of colored Jones polynomials to specializations of other quantum knot polynomials. These identities can also be explained by coincidences between small modular categories involving the even parts of the D2n planar algebras. We discuss the origins of these coincidences, explaining the role of SO level-rank duality, Kirby�Melvin symmetry, and properties of small Dynkin diagrams. One of these coincidences involves G2 and does not appear to be related to level-rank duality.

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Citation

Source

Quantum Topology

Type

Journal article

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Restricted until

2037-12-31