On The Homflypt Skein Module of S1 x S2

Abstract

Let k be a subring of the field of rational functions in x, v, s which contains x 1, v 1, s 1. If M is an oriented 3-manifold, let S(M) denote the Homflypt skein module of M over k. This is the free k-module generated by isotopy classes of framed oriented links in M quotiented by the Homflypt skein relations: (1) x-1L+-xL-=(s-s-1)L0; (2) L with a positive twist =(xv-1)L; (3) L O=(v-v-1s-s-1)L where O is the unknot. We give two bases for the relative Homflypt skein module of the solid torus with 2 points in the boundary. The first basis is related to the basis of S(S1× D2) given by V. Turaev and also J. Hoste and M. Kidwell; the second basis is related to a Young idempotent basis for S(S1× D2) based on the work of A. Aiston, H. Morton and C. Blanchet. We prove that if the elements s2n-1, for n a nonzero integer, and the elements s2m-v2, for any integer m, are invertible in k, then S(S1 × S2)=k-torsion module k. Here the free part is generated by the empty link φ. In addition, if the elements s2m-v4, for m an integer, are invertible in k, then S(S1 × S2) has no torsion. We also obtain some results for more general k.

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