The HOMFLYPT skein module of S1 × S2 via braids
Abstract
In this paper we compute the HOMFLYPT skein module of S1 × S2\, \, L(0, 1), denoted S(S1 × S2), using braid-theoretic techniques. We extend the Lambropoulou invariant, X, for links in the solid torus ST to links in S1 × S2, by solving an infinite system of equations of the form Xa = Xbbm(a), where bbm(a) denotes all possible band moves applied to a, for all a in a basis of S(ST). We show that the free part of S(S1 × S2) is generated by the empty link, while all other elements are torsion.
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