Maximal universal invariants from finite quotients of Verma modules

Abstract

We construct a sequence of new universal quantum knot invariants that are lifts of both the semi-simple and non semi-simple Uq(sl2) quantum knot invariants. More specifically, for any level N we define a ``level N universal invariant'' Ω N(L) arising from quantum traces on finite quotients of the generic Verma module over certain quotient rings. We show that for N prime, this is the maximal invariant that can arise from the N-part of the Verma module, and it is a specific interpolation between the Nth coloured Jones and Nth ADO polynomials. For N non prime Ω N(L)(q,s) has a richer structure, it recovers the Nth coloured Jones and Nth ADO polynomials, but it could contain more information which is not seen in the sequence of coloured Jones and ADO invariants.