The slN Symmetrically Large Coloured R Matrix
Abstract
For every knot K and lie algebra g, there is a Gukov-Manolescu series denoted FgK which serves as an analytic continuation of the quantum knot invariants associated to finite dimensional irreducible representations of g. There has been a great deal of work done on computing this invariant for g = sl2 but comparatively less work has studied other lie algebras. In this paper we extend the large colour R matrix from sl2 to symmetrically coloured slN. This gives a definition for FslN, symK for positive braid knots and allows for predictions of FslN, symK for a much larger class of knots and links. It also provides further evidence towards a conjectural HOMFLY-PT analouge of FK.
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