Tangle Functors from Semicyclic Representations

Abstract

Let q be a 2Nth root of unity where N is odd. Let Uq(sl2) denote the quantum group with large center corresponding to the lie algebra sl2 with generators E,F,K, and K-1. A semicyclic representation of Uq(sl2) is an N-dimensional irreducible representation :Uq(sl2)→ MN(C), so that (EN)=aId with a≠ 0, (FN)=0 and (KN)=Id. We construct a tangle functor for framed homogeneous tangles colored with semicyclic representations, and prove that for (1,1)-tangles coming from knots, the invariant defined by the tangle functor coincides with Kashaev's invariant.