A spanning set and potential basis of the mixed Hecke algebra on two fixed strands

Abstract

The mixed braid groups B2,n, \ n ∈ N, with two fixed strands and n moving ones, are known to be related to the knot theory of certain families of 3-manifolds. In this paper we define the mixed Hecke algebra H2,n(q) as the quotient of the group algebra Z\, [q 1] \, B2,n over the quadratic relations of the classical Iwahori-Hecke algebra for the braiding generators. We furhter provide a potential basis n for H2,n(q), which we prove is a spanning set for the Z[q 1]-additive structure of this algebra. The sets n,\ n ∈ Z appear to be good candidates for an inductive basis suitable for the construction of Homflypt-type invariants for knots and links in the above 3-manifolds.