Markov trace on Funar algebra

Abstract

Funar algebra K∞=K∞(α,β;k) is the quotient of the group algebra over a ring k of the braid group B∞ by two cubic relations: σ13-ασ12+βσ1-1=0 and another one which involves σ1 and σ2. The universal Markov trace on K∞ is the quotient map t of K∞(α,β,k[u,v]) to its quotient (as a k[u,v]-module) by trace relations xy=yx and by Markov relations σnx=ux, σn-1x=vx for x∈ Kn. It is easy to check that the quotient is of the form k[u,v]/I for some ideal I (i. e. that the trace t is determined by t(1)). We give an algorithm to compute the ideal I and we present the result of computations in some special cases. In the last section we discuss some properties of the resulting link invariant. This invariant for β=0, k=GF(37)[α] detects the chirality of the knots 1048 and 1091 and it distinguish many other pairs of knots with equal HOMFLY polynomials.