The Kauffman bracket skein module of S1× S2 via braids

Abstract

In this paper we present two different ways for computing the Kauffman bracket skein module of S1× S2, KBSM(S1× S2), via braids. We first extend the universal Kauffman bracket type invariant V for knots and links in the Solid Torus ST, which is obtained via a unique Markov trace constructed on the generalized Temperley-Lieb algebra of type B, to an invariant for knots and links in S1× S2. We do that by imposing on V relations coming from the braid band moves. These moves reflect isotopy in S1× S2 and they are similar to the second Kirby move. We obtain an infinite system of equations, a solution of which, is equivalent to computing KBSM(S1× S2). We show that KBSM(S1× S2) is not torsion free and that its free part is generated by the unknot (or the empty knot). We then present a diagrammatic method for computing KBSM(S1× S2) via braids. Using this diagrammatic method we also obtain a closed formula for the torsion part of KBSM(S1× S2).